正方晶系 (Tetragonal) に属する空間群のワイコフ位置(Wyckoff letter)の一覧をまとめました。ワイコフ位置の概念やサイトシンメトリー (Site symmetry) 記号の読み方については別ページで解説しています。
- Serial No,.: Serial number (1~530)
- ITA No,.: Number listed on the International Tables for Crystallography, Vol A,. (1~230)
- SG symbol: Space group symbol (HM full notation)
- M: Multiplicity
- W: Wyckoff Letter
- SS: Site Symmetry
- Position: Equivalent position
| Serial No,. | ITA No,. | SG symbol | M | W | SS | Positions | |||
|---|---|---|---|---|---|---|---|---|---|
| 349 | 75 | (P 4) | ((0,0,0)+) | ||||||
| 4 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| 2 | (c) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | |||||
| 1 | (b) | (4,.,.) | (frac{1}{2},frac{1}{2},z) | ||||||
| 1 | (a) | (4,.,.) | (0,0,z) | ||||||
| 350 | 76 | (P 4_1) | ((0,0,0)+) | ||||||
| 4 | (a) | (1) | (x,y,z) | (bar{x},bar{y},z+frac{1}{2}) | (bar{y},x,z+frac{1}{4}) | (y,bar{x},z+frac{3}{4}) | |||
| 351 | 77 | (P 4_2) | ((0,0,0)+) | ||||||
| 4 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| 2 | (c) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | |||||
| 2 | (b) | (2,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||||
| 2 | (a) | (2,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | |||||
| 352 | 78 | (P 4_3) | ((0,0,0)+) | ||||||
| 4 | (a) | (1) | (x,y,z) | (bar{x},bar{y},z+frac{1}{2}) | (bar{y},x,z+frac{3}{4}) | (y,bar{x},z+frac{1}{4}) | |||
| 353 | 79 | (I 4) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 8 | (c) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| 4 | (b) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | |||||
| 2 | (a) | (4,.,.) | (0,0,z) | ||||||
| 354 | 80 | (I 4_1) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 8 | (b) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| 4 | (a) | (2,.,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | |||||
| 355 | 81 | (P bar{4}) | ((0,0,0)+) | ||||||
| 4 | (h) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| 2 | (g) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 2 | (f) | (2,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||||
| 2 | (e) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 1 | (d) | (bar{4},.,.) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 1 | (c) | (bar{4},.,.) | (frac{1}{2},frac{1}{2},0) | ||||||
| 1 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | ||||||
| 1 | (a) | (bar{4},.,.) | (0,0,0) | ||||||
| 356 | 82 | (I bar{4}) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 8 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| 4 | (f) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 4 | (e) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 2 | (d) | (bar{4},.,.) | (0,frac{1}{2},frac{3}{4}) | ||||||
| 2 | (c) | (bar{4},.,.) | (0,frac{1}{2},frac{1}{4}) | ||||||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | ||||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | ||||||
| 357 | 83 | (P 4/m) | ((0,0,0)+) | ||||||
| 8 | (l) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| 4 | (k) | (m,.,.) | (x,y,frac{1}{2}) | (bar{x},bar{y},frac{1}{2}) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| 4 | (j) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| 4 | (i) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 2 | (h) | (4,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||||
| 2 | (g) | (4,.,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 2 | (f) | (2/m,.,.) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (e) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 1 | (d) | (4/m,.,.) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 1 | (c) | (4/m,.,.) | (frac{1}{2},frac{1}{2},0) | ||||||
| 1 | (b) | (4/m,.,.) | (0,0,frac{1}{2}) | ||||||
| 1 | (a) | (4/m,.,.) | (0,0,0) | ||||||
| 358 | 84 | (P 4_2/m) | ((0,0,0)+) | ||||||
| 8 | (k) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}+frac{1}{2}) | (bar{y},x,bar{z}+frac{1}{2}) | ||||||
| 4 | (j) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| 4 | (i) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 4 | (h) | (2,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (g) | (2,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | (0,0,bar{z}) | (0,0,bar{z}+frac{1}{2}) | |||
| 2 | (f) | (bar{4},.,.) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (e) | (bar{4},.,.) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 2 | (d) | (2/m,.,.) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,0) | |||||
| 2 | (c) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (b) | (2/m,.,.) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (2/m,.,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 359 | 85 | (P 4/n) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z) | (y+frac{1}{2},bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| 4 | (f) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | (0,0,bar{z}) | |||
| 4 | (e) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||
| 4 | (d) | (bar{1}) | (frac{1}{4},frac{1}{4},0) | (frac{3}{4},frac{3}{4},0) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},0) | |||
| 2 | (c) | (4,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 360 | 85 | (P 4/n) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z) | (y,bar{x}+frac{1}{2},z) | |||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}) | (bar{y},x+frac{1}{2},bar{z}) | ||||||
| 4 | (f) | (2,.,.) | (frac{1}{4},frac{3}{4},z) | (frac{3}{4},frac{1}{4},z) | (frac{3}{4},frac{1}{4},bar{z}) | (frac{1}{4},frac{3}{4},bar{z}) | |||
| 4 | (e) | (bar{1}) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| 4 | (d) | (bar{1}) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| 2 | (c) | (4,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{3}{4},frac{3}{4},bar{z}) | |||||
| 2 | (b) | (bar{4},.,.) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||||
| 2 | (a) | (bar{4},.,.) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},0) | |||||
| 361 | 86 | (P 4_2/n) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| 4 | (f) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | |||
| 4 | (e) | (2,.,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | |||
| 4 | (d) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | |||
| 4 | (c) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 362 | 86 | (P 4_2/n) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x},z+frac{1}{2}) | |||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y,bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},x,bar{z}+frac{1}{2}) | ||||||
| 4 | (f) | (2,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{3}{4},frac{3}{4},z+frac{1}{2}) | (frac{3}{4},frac{3}{4},bar{z}) | (frac{1}{4},frac{1}{4},bar{z}+frac{1}{2}) | |||
| 4 | (e) | (2,.,.) | (frac{3}{4},frac{1}{4},z) | (frac{3}{4},frac{1}{4},z+frac{1}{2}) | (frac{1}{4},frac{3}{4},bar{z}) | (frac{1}{4},frac{3}{4},bar{z}+frac{1}{2}) | |||
| 4 | (d) | (bar{1}) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||
| 4 | (c) | (bar{1}) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||
| 2 | (b) | (bar{4},.,.) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | |||||
| 2 | (a) | (bar{4},.,.) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | |||||
| 363 | 87 | (I 4/m) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (i) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| 8 | (h) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| 8 | (g) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 8 | (f) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||
| 4 | (e) | (4,.,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 4 | (d) | (bar{4},.,.) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | |||||
| 4 | (c) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (b) | (4/m,.,.) | (0,0,frac{1}{2}) | ||||||
| 2 | (a) | (4/m,.,.) | (0,0,0) | ||||||
| 364 | 88 | (I 4_1/a) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (f) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| (bar{x},bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (x+frac{1}{2},y,bar{z}+frac{3}{4}) | (y,bar{x},bar{z}) | (bar{y}+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| 8 | (e) | (2,.,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | (0,frac{1}{2},bar{z}+frac{1}{4}) | (0,0,bar{z}) | |||
| 8 | (d) | (bar{1}) | (0,frac{1}{4},frac{5}{8}) | (frac{1}{2},frac{1}{4},frac{1}{8}) | (frac{3}{4},frac{1}{2},frac{7}{8}) | (frac{3}{4},0,frac{3}{8}) | |||
| 8 | (c) | (bar{1}) | (0,frac{1}{4},frac{1}{8}) | (frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{3}{4},frac{1}{2},frac{3}{8}) | (frac{3}{4},0,frac{7}{8}) | |||
| 4 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (0,frac{1}{2},frac{3}{4}) | |||||
| 4 | (a) | (bar{4},.,.) | (0,0,0) | (0,frac{1}{2},frac{1}{4}) | |||||
| 365 | 88 | (I 4_1/a) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (f) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y},z+frac{1}{2}) | (bar{y}+frac{3}{4},x+frac{1}{4},z+frac{1}{4}) | (y+frac{3}{4},bar{x}+frac{3}{4},z+frac{3}{4}) | |||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y,bar{z}+frac{1}{2}) | (y+frac{1}{4},bar{x}+frac{3}{4},bar{z}+frac{3}{4}) | (bar{y}+frac{1}{4},x+frac{1}{4},bar{z}+frac{1}{4}) | ||||||
| 8 | (e) | (2,.,.) | (0,frac{1}{4},z) | (frac{1}{2},frac{1}{4},z+frac{1}{4}) | (0,frac{3}{4},bar{z}) | (frac{1}{2},frac{3}{4},bar{z}+frac{3}{4}) | |||
| 8 | (d) | (bar{1}) | (0,0,frac{1}{2}) | (frac{1}{2},0,0) | (frac{3}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | |||
| 8 | (c) | (bar{1}) | (0,0,0) | (frac{1}{2},0,frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | |||
| 4 | (b) | (bar{4},.,.) | (0,frac{1}{4},frac{5}{8}) | (frac{1}{2},frac{1}{4},frac{7}{8}) | |||||
| 4 | (a) | (bar{4},.,.) | (0,frac{1}{4},frac{1}{8}) | (frac{1}{2},frac{1}{4},frac{3}{8}) | |||||
| 366 | 89 | (P 4 2 2) | ((0,0,0)+) | ||||||
| 8 | (p) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| 4 | (o) | (,.,2,.) | (x,frac{1}{2},0) | (bar{x},frac{1}{2},0) | (frac{1}{2},x,0) | (frac{1}{2},bar{x},0) | |||
| 4 | (n) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| 4 | (m) | (,.,2,.) | (x,frac{1}{2},frac{1}{2}) | (bar{x},frac{1}{2},frac{1}{2}) | (frac{1}{2},x,frac{1}{2}) | (frac{1}{2},bar{x},frac{1}{2}) | |||
| 4 | (l) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,x,0) | (0,bar{x},0) | |||
| 4 | (k) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x},x,frac{1}{2}) | (x,bar{x},frac{1}{2}) | |||
| 4 | (j) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,0) | (x,bar{x},0) | |||
| 4 | (i) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 2 | (h) | (4,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||||
| 2 | (g) | (4,.,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 2 | (f) | (2,2,2) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||||
| 2 | (e) | (2,2,2) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||||
| 1 | (d) | (4,2,2) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 1 | (c) | (4,2,2) | (frac{1}{2},frac{1}{2},0) | ||||||
| 1 | (b) | (4,2,2) | (0,0,frac{1}{2}) | ||||||
| 1 | (a) | (4,2,2) | (0,0,0) | ||||||
| 367 | 90 | (P 4 2_1 2) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z) | (y+frac{1}{2},bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| 4 | (f) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| 4 | (e) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},bar{x}+frac{1}{2},0) | |||
| 4 | (d) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | (0,0,bar{z}) | |||
| 2 | (c) | (4,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 2 | (b) | (2,.,22) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (2,.,22) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 368 | 91 | (P 4_1 2 2) | ((0,0,0)+) | ||||||
| 8 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z+frac{1}{2}) | (bar{y},x,z+frac{1}{4}) | (y,bar{x},z+frac{3}{4}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}+frac{1}{2}) | (y,x,bar{z}+frac{3}{4}) | (bar{y},bar{x},bar{z}+frac{1}{4}) | ||||||
| 4 | (c) | (,.,.,2) | (x,x,frac{3}{8}) | (bar{x},bar{x},frac{7}{8}) | (bar{x},x,frac{5}{8}) | (x,bar{x},frac{1}{8}) | |||
| 4 | (b) | (,.,2,.) | (frac{1}{2},y,0) | (frac{1}{2},bar{y},frac{1}{2}) | (bar{y},frac{1}{2},frac{1}{4}) | (y,frac{1}{2},frac{3}{4}) | |||
| 4 | (a) | (,.,2,.) | (0,y,0) | (0,bar{y},frac{1}{2}) | (bar{y},0,frac{1}{4}) | (y,0,frac{3}{4}) | |||
| 369 | 92 | (P 4_1 2_1 2) | ((0,0,0)+) | ||||||
| 8 | (b) | (1) | (x,y,z) | (bar{x},bar{y},z+frac{1}{2}) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{3}{4}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{4}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{3}{4}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| 4 | (a) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | |||
| 370 | 93 | (P 4_2 2 2) | ((0,0,0)+) | ||||||
| 8 | (p) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| 4 | (o) | (,.,.,2) | (x,x,frac{3}{4}) | (bar{x},bar{x},frac{3}{4}) | (bar{x},x,frac{1}{4}) | (x,bar{x},frac{1}{4}) | |||
| 4 | (n) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (bar{x},x,frac{3}{4}) | (x,bar{x},frac{3}{4}) | |||
| 4 | (m) | (,.,2,.) | (x,frac{1}{2},0) | (bar{x},frac{1}{2},0) | (frac{1}{2},x,frac{1}{2}) | (frac{1}{2},bar{x},frac{1}{2}) | |||
| 4 | (l) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,0) | (0,bar{x},0) | |||
| 4 | (k) | (,.,2,.) | (x,frac{1}{2},frac{1}{2}) | (bar{x},frac{1}{2},frac{1}{2}) | (frac{1}{2},x,0) | (frac{1}{2},bar{x},0) | |||
| 4 | (j) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| 4 | (i) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 4 | (h) | (2,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (g) | (2,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | (0,0,bar{z}) | (0,0,bar{z}+frac{1}{2}) | |||
| 2 | (f) | (2,.,22) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (e) | (2,.,22) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 2 | (d) | (2,2,2) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,0) | |||||
| 2 | (c) | (2,2,2) | (0,frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (b) | (2,2,2) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (2,2,2) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 371 | 94 | (P 4_2 2_1 2) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| 4 | (f) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},bar{x}+frac{1}{2},0) | |||
| 4 | (e) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| 4 | (d) | (2,.,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | |||
| 4 | (c) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | |||
| 2 | (b) | (2,.,22) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (2,.,22) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 372 | 95 | (P 4_3 2 2) | ((0,0,0)+) | ||||||
| 8 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z+frac{1}{2}) | (bar{y},x,z+frac{3}{4}) | (y,bar{x},z+frac{1}{4}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}+frac{1}{2}) | (y,x,bar{z}+frac{1}{4}) | (bar{y},bar{x},bar{z}+frac{3}{4}) | ||||||
| 4 | (c) | (,.,.,2) | (x,x,frac{5}{8}) | (bar{x},bar{x},frac{1}{8}) | (bar{x},x,frac{3}{8}) | (x,bar{x},frac{7}{8}) | |||
| 4 | (b) | (,.,2,.) | (frac{1}{2},y,0) | (frac{1}{2},bar{y},frac{1}{2}) | (bar{y},frac{1}{2},frac{3}{4}) | (y,frac{1}{2},frac{1}{4}) | |||
| 4 | (a) | (,.,2,.) | (0,y,0) | (0,bar{y},frac{1}{2}) | (bar{y},0,frac{3}{4}) | (y,0,frac{1}{4}) | |||
| 373 | 96 | (P 4_3 2_1 2) | ((0,0,0)+) | ||||||
| 8 | (b) | (1) | (x,y,z) | (bar{x},bar{y},z+frac{1}{2}) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{3}{4}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{4}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{3}{4}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| 4 | (a) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | |||
| 374 | 97 | (I 4 2 2) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (k) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| 8 | (j) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{1}{4}) | (x+frac{1}{2},bar{x},frac{1}{4}) | |||
| 8 | (i) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| 8 | (h) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,x,0) | (0,bar{x},0) | |||
| 8 | (g) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,0) | (x,bar{x},0) | |||
| 8 | (f) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 4 | (e) | (4,.,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 4 | (d) | (2,.,22) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | |||||
| 4 | (c) | (2,2,2) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (b) | (4,2,2) | (0,0,frac{1}{2}) | ||||||
| 2 | (a) | (4,2,2) | (0,0,0) | ||||||
| 375 | 98 | (I 4_1 2 2) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (g) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{3}{4}) | (x,bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}) | ||||||
| 8 | (f) | (,.,2,.) | (x,frac{1}{4},frac{1}{8}) | (bar{x}+frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{3}{4},x+frac{1}{2},frac{3}{8}) | (frac{3}{4},bar{x},frac{7}{8}) | |||
| 8 | (e) | (,.,.,2) | (x,bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},bar{x},frac{3}{4}) | |||
| 8 | (d) | (,.,.,2) | (x,x,0) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | |||
| 8 | (c) | (2,.,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | (frac{1}{2},0,bar{z}+frac{3}{4}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (b) | (2,.,22) | (0,0,frac{1}{2}) | (0,frac{1}{2},frac{3}{4}) | |||||
| 4 | (a) | (2,.,22) | (0,0,0) | (0,frac{1}{2},frac{1}{4}) | |||||
| 376 | 99 | (P 4 m m) | ((0,0,0)+) | ||||||
| 8 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 4 | (f) | (,.m,.) | (x,frac{1}{2},z) | (bar{x},frac{1}{2},z) | (frac{1}{2},x,z) | (frac{1}{2},bar{x},z) | |||
| 4 | (e) | (,.m,.) | (x,0,z) | (bar{x},0,z) | (0,x,z) | (0,bar{x},z) | |||
| 4 | (d) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x},x,z) | (x,bar{x},z) | |||
| 2 | (c) | (2,mm,.) | (frac{1}{2},0,z) | (0,frac{1}{2},z) | |||||
| 1 | (b) | (4,m,m) | (frac{1}{2},frac{1}{2},z) | ||||||
| 1 | (a) | (4,m,m) | (0,0,z) | ||||||
| 377 | 100 | (P 4 b m) | ((0,0,0)+) | ||||||
| 8 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 4 | (c) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z) | (x+frac{1}{2},bar{x},z) | |||
| 2 | (b) | (2,.mm) | (frac{1}{2},0,z) | (0,frac{1}{2},z) | |||||
| 2 | (a) | (4,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z) | |||||
| 378 | 101 | (P 4_2 c m) | ((0,0,0)+) | ||||||
| 8 | (e) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 4 | (d) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x},x,z+frac{1}{2}) | (x,bar{x},z+frac{1}{2}) | |||
| 4 | (c) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,z) | |||
| 2 | (b) | (2,.mm) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||||
| 2 | (a) | (2,.mm) | (0,0,z) | (0,0,z+frac{1}{2}) | |||||
| 379 | 102 | (P 4_2 n m) | ((0,0,0)+) | ||||||
| 8 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 4 | (c) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| 4 | (b) | (2,.,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,z+frac{1}{2}) | (frac{1}{2},0,z) | |||
| 2 | (a) | (2,.mm) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||||
| 380 | 103 | (P 4 c c) | ((0,0,0)+) | ||||||
| 8 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 4 | (c) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,z+frac{1}{2}) | |||
| 2 | (b) | (4,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||||
| 2 | (a) | (4,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | |||||
| 381 | 104 | (P 4 n c) | ((0,0,0)+) | ||||||
| 8 | (c) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 4 | (b) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},z+frac{1}{2}) | |||
| 2 | (a) | (4,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||||
| 382 | 105 | (P 4_2 m c) | ((0,0,0)+) | ||||||
| 8 | (f) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 4 | (e) | (,.m,.) | (x,frac{1}{2},z) | (bar{x},frac{1}{2},z) | (frac{1}{2},x,z+frac{1}{2}) | (frac{1}{2},bar{x},z+frac{1}{2}) | |||
| 4 | (d) | (,.m,.) | (x,0,z) | (bar{x},0,z) | (0,x,z+frac{1}{2}) | (0,bar{x},z+frac{1}{2}) | |||
| 2 | (c) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | |||||
| 2 | (b) | (2,mm,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||||
| 2 | (a) | (2,mm,.) | (0,0,z) | (0,0,z+frac{1}{2}) | |||||
| 383 | 106 | (P 4_2 b c) | ((0,0,0)+) | ||||||
| 8 | (c) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 4 | (b) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (frac{1}{2},0,z) | (0,frac{1}{2},z+frac{1}{2}) | |||
| 4 | (a) | (2,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| 384 | 107 | (I 4 m m) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (e) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 8 | (d) | (,.m,.) | (x,0,z) | (bar{x},0,z) | (0,x,z) | (0,bar{x},z) | |||
| 8 | (c) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x},x,z) | (x,bar{x},z) | |||
| 4 | (b) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | |||||
| 2 | (a) | (4,m,m) | (0,0,z) | ||||||
| 385 | 108 | (I 4 c m) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (d) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 8 | (c) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z) | (x+frac{1}{2},bar{x},z) | |||
| 4 | (b) | (2,.mm) | (frac{1}{2},0,z) | (0,frac{1}{2},z) | |||||
| 4 | (a) | (4,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | |||||
| 386 | 109 | (I 4_1 m d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (c) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| (x,bar{y},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y},bar{x}+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},x,z+frac{3}{4}) | ||||||
| 8 | (b) | (,.m,.) | (0,y,z) | (frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},0,z+frac{3}{4}) | |||
| 4 | (a) | (2,mm,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | |||||
| 387 | 110 | (I 4_1 c d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (b) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| (x,bar{y},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y},bar{x}+frac{1}{2},z+frac{3}{4}) | (y+frac{1}{2},x,z+frac{1}{4}) | ||||||
| 8 | (a) | (2,.,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | (0,0,z+frac{1}{2}) | (0,frac{1}{2},z+frac{3}{4}) | |||
| 388 | 111 | (P bar{4} 2 m) | ((0,0,0)+) | ||||||
| 8 | (o) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 4 | (n) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (x,bar{x},bar{z}) | (bar{x},x,bar{z}) | |||
| 4 | (m) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,z) | |||
| 4 | (l) | (,.,2,.) | (x,frac{1}{2},0) | (bar{x},frac{1}{2},0) | (frac{1}{2},bar{x},0) | (frac{1}{2},x,0) | |||
| 4 | (k) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,bar{x},frac{1}{2}) | (0,x,frac{1}{2}) | |||
| 4 | (j) | (,.,2,.) | (x,frac{1}{2},frac{1}{2}) | (bar{x},frac{1}{2},frac{1}{2}) | (frac{1}{2},bar{x},frac{1}{2}) | (frac{1}{2},x,frac{1}{2}) | |||
| 4 | (i) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,bar{x},0) | (0,x,0) | |||
| 2 | (h) | (2,.mm) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||||
| 2 | (g) | (2,.mm) | (0,0,z) | (0,0,bar{z}) | |||||
| 2 | (f) | (2,2,2) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||||
| 2 | (e) | (2,2,2) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||||
| 1 | (d) | (bar{4},2,m) | (frac{1}{2},frac{1}{2},0) | ||||||
| 1 | (c) | (bar{4},2,m) | (0,0,frac{1}{2}) | ||||||
| 1 | (b) | (bar{4},2,m) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 1 | (a) | (bar{4},2,m) | (0,0,0) | ||||||
| 389 | 112 | (P bar{4} 2 c) | ((0,0,0)+) | ||||||
| 8 | (n) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (bar{x},y,bar{z}+frac{1}{2}) | (x,bar{y},bar{z}+frac{1}{2}) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 4 | (m) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},0,z+frac{1}{2}) | |||
| 4 | (l) | (2,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| 4 | (k) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (0,0,bar{z}+frac{1}{2}) | (0,0,z+frac{1}{2}) | |||
| 4 | (j) | (,.,2,.) | (0,y,frac{1}{4}) | (0,bar{y},frac{1}{4}) | (y,0,frac{3}{4}) | (bar{y},0,frac{3}{4}) | |||
| 4 | (i) | (,.,2,.) | (x,frac{1}{2},frac{1}{4}) | (bar{x},frac{1}{2},frac{1}{4}) | (frac{1}{2},bar{x},frac{3}{4}) | (frac{1}{2},x,frac{3}{4}) | |||
| 4 | (h) | (,.,2,.) | (frac{1}{2},y,frac{1}{4}) | (frac{1}{2},bar{y},frac{1}{4}) | (y,frac{1}{2},frac{3}{4}) | (bar{y},frac{1}{2},frac{3}{4}) | |||
| 4 | (g) | (,.,2,.) | (x,0,frac{1}{4}) | (bar{x},0,frac{1}{4}) | (0,bar{x},frac{3}{4}) | (0,x,frac{3}{4}) | |||
| 2 | (f) | (bar{4},.,.) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (e) | (bar{4},.,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 2 | (d) | (2,2,2) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | |||||
| 2 | (c) | (2,2,2) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (b) | (2,2,2) | (frac{1}{2},0,frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | |||||
| 2 | (a) | (2,2,2) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 390 | 113 | (P bar{4} 2_1 m) | ((0,0,0)+) | ||||||
| 8 | (f) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 4 | (e) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (x+frac{1}{2},bar{x},bar{z}) | (bar{x}+frac{1}{2},x,bar{z}) | |||
| 4 | (d) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},z) | |||
| 2 | (c) | (2,.mm) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 391 | 114 | (P bar{4} 2_1 c) | ((0,0,0)+) | ||||||
| 8 | (e) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 4 | (d) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (0,frac{1}{2},z+frac{1}{2}) | |||
| 4 | (c) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 392 | 115 | (P bar{4} m 2) | ((0,0,0)+) | ||||||
| 8 | (l) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (x,bar{y},z) | (bar{x},y,z) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| 4 | (k) | (,.m,.) | (x,frac{1}{2},z) | (bar{x},frac{1}{2},z) | (frac{1}{2},bar{x},bar{z}) | (frac{1}{2},x,bar{z}) | |||
| 4 | (j) | (,.m,.) | (x,0,z) | (bar{x},0,z) | (0,bar{x},bar{z}) | (0,x,bar{z}) | |||
| 4 | (i) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (x,bar{x},frac{1}{2}) | (bar{x},x,frac{1}{2}) | |||
| 4 | (h) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (x,bar{x},0) | (bar{x},x,0) | |||
| 2 | (g) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 2 | (f) | (2,mm,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||||
| 2 | (e) | (2,mm,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 1 | (d) | (bar{4},m,2) | (0,0,frac{1}{2}) | ||||||
| 1 | (c) | (bar{4},m,2) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 1 | (b) | (bar{4},m,2) | (frac{1}{2},frac{1}{2},0) | ||||||
| 1 | (a) | (bar{4},m,2) | (0,0,0) | ||||||
| 393 | 116 | (P bar{4} c 2) | ((0,0,0)+) | ||||||
| 8 | (j) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| 4 | (i) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 4 | (h) | (2,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (g) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (0,0,z+frac{1}{2}) | (0,0,bar{z}+frac{1}{2}) | |||
| 4 | (f) | (,.,.,2) | (x,x,frac{3}{4}) | (bar{x},bar{x},frac{3}{4}) | (x,bar{x},frac{1}{4}) | (bar{x},x,frac{1}{4}) | |||
| 4 | (e) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (x,bar{x},frac{3}{4}) | (bar{x},x,frac{3}{4}) | |||
| 2 | (d) | (bar{4},.,.) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (c) | (bar{4},.,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 2 | (b) | (2,.,22) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (a) | (2,.,22) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 394 | 117 | (P bar{4} b 2) | ((0,0,0)+) | ||||||
| 8 | (i) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| 4 | (h) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{2}) | (bar{x},bar{x}+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x,frac{1}{2}) | |||
| 4 | (g) | (,.,.,2) | (x,x+frac{1}{2},0) | (bar{x},bar{x}+frac{1}{2},0) | (x+frac{1}{2},bar{x},0) | (bar{x}+frac{1}{2},x,0) | |||
| 4 | (f) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | |||
| 4 | (e) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||
| 2 | (d) | (2,.,22) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (c) | (2,.,22) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 395 | 118 | (P bar{4} n 2) | ((0,0,0)+) | ||||||
| 8 | (i) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| 4 | (h) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (g) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | |||
| 4 | (f) | (,.,.,2) | (x,bar{x}+frac{1}{2},frac{1}{4}) | (bar{x},x+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},bar{x},frac{3}{4}) | (x+frac{1}{2},x,frac{3}{4}) | |||
| 4 | (e) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 2 | (d) | (2,.,22) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{1}{4}) | |||||
| 2 | (c) | (2,.,22) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | |||||
| 2 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 396 | 119 | (I bar{4} m 2) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (j) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (x,bar{y},z) | (bar{x},y,z) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| 8 | (i) | (,.m,.) | (x,0,z) | (bar{x},0,z) | (0,bar{x},bar{z}) | (0,x,bar{z}) | |||
| 8 | (h) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | |||
| 8 | (g) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (x,bar{x},0) | (bar{x},x,0) | |||
| 4 | (f) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 4 | (e) | (2,mm,.) | (0,0,z) | (0,0,bar{z}) | |||||
| 2 | (d) | (bar{4},m,2) | (0,frac{1}{2},frac{3}{4}) | ||||||
| 2 | (c) | (bar{4},m,2) | (0,frac{1}{2},frac{1}{4}) | ||||||
| 2 | (b) | (bar{4},m,2) | (0,0,frac{1}{2}) | ||||||
| 2 | (a) | (bar{4},m,2) | (0,0,0) | ||||||
| 397 | 120 | (I bar{4} c 2) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (i) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| 8 | (h) | (,.,.,2) | (x,x+frac{1}{2},0) | (bar{x},bar{x}+frac{1}{2},0) | (x+frac{1}{2},bar{x},0) | (bar{x}+frac{1}{2},x,0) | |||
| 8 | (g) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 8 | (f) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (0,0,z+frac{1}{2}) | (0,0,bar{z}+frac{1}{2}) | |||
| 8 | (e) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (x,bar{x},frac{3}{4}) | (bar{x},x,frac{3}{4}) | |||
| 4 | (d) | (2,.,22) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 4 | (c) | (bar{4},.,.) | (0,frac{1}{2},frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | |||||
| 4 | (b) | (bar{4},.,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 4 | (a) | (2,.,22) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 398 | 121 | (I bar{4} 2 m) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (j) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 8 | (i) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (x,bar{x},bar{z}) | (bar{x},x,bar{z}) | |||
| 8 | (h) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,z) | |||
| 8 | (g) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,bar{x},frac{1}{2}) | (0,x,frac{1}{2}) | |||
| 8 | (f) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,bar{x},0) | (0,x,0) | |||
| 4 | (e) | (2,.mm) | (0,0,z) | (0,0,bar{z}) | |||||
| 4 | (d) | (bar{4},.,.) | (0,frac{1}{2},frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | |||||
| 4 | (c) | (2,2,2) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (b) | (bar{4},2,m) | (0,0,frac{1}{2}) | ||||||
| 2 | (a) | (bar{4},2,m) | (0,0,0) | ||||||
| 399 | 122 | (I bar{4} 2 d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 16 | (e) | (1) | (x,y,z) | (bar{x},bar{y},z) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{3}{4}) | (x+frac{1}{2},bar{y},bar{z}+frac{3}{4}) | (bar{y}+frac{1}{2},bar{x},z+frac{3}{4}) | (y+frac{1}{2},x,z+frac{3}{4}) | ||||||
| 8 | (d) | (,.,2,.) | (x,frac{1}{4},frac{1}{8}) | (bar{x},frac{3}{4},frac{1}{8}) | (frac{1}{4},bar{x},frac{7}{8}) | (frac{3}{4},x,frac{7}{8}) | |||
| 8 | (c) | (2,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},0,bar{z}+frac{3}{4}) | (frac{1}{2},0,z+frac{3}{4}) | |||
| 4 | (b) | (bar{4},.,.) | (0,0,frac{1}{2}) | (frac{1}{2},0,frac{1}{4}) | |||||
| 4 | (a) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},0,frac{3}{4}) | |||||
| 400 | 123 | (P 4/m 2/m 2/m) | ((0,0,0)+) | ||||||
| 16 | (u) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 8 | (t) | (,.m,.) | (x,frac{1}{2},z) | (bar{x},frac{1}{2},z) | (frac{1}{2},x,z) | (frac{1}{2},bar{x},z) | |||
| (bar{x},frac{1}{2},bar{z}) | (x,frac{1}{2},bar{z}) | (frac{1}{2},x,bar{z}) | (frac{1}{2},bar{x},bar{z}) | ||||||
| 8 | (s) | (,.m,.) | (x,0,z) | (bar{x},0,z) | (0,x,z) | (0,bar{x},z) | |||
| (bar{x},0,bar{z}) | (x,0,bar{z}) | (0,x,bar{z}) | (0,bar{x},bar{z}) | ||||||
| 8 | (r) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x},x,z) | (x,bar{x},z) | |||
| (bar{x},x,bar{z}) | (x,bar{x},bar{z}) | (x,x,bar{z}) | (bar{x},bar{x},bar{z}) | ||||||
| 8 | (q) | (m,.,.) | (x,y,frac{1}{2}) | (bar{x},bar{y},frac{1}{2}) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| (bar{x},y,frac{1}{2}) | (x,bar{y},frac{1}{2}) | (y,x,frac{1}{2}) | (bar{y},bar{x},frac{1}{2}) | ||||||
| 8 | (p) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| (bar{x},y,0) | (x,bar{y},0) | (y,x,0) | (bar{y},bar{x},0) | ||||||
| 4 | (o) | (m,2m,.) | (x,frac{1}{2},frac{1}{2}) | (bar{x},frac{1}{2},frac{1}{2}) | (frac{1}{2},x,frac{1}{2}) | (frac{1}{2},bar{x},frac{1}{2}) | |||
| 4 | (n) | (m,2m,.) | (x,frac{1}{2},0) | (bar{x},frac{1}{2},0) | (frac{1}{2},x,0) | (frac{1}{2},bar{x},0) | |||
| 4 | (m) | (m,2m,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| 4 | (l) | (m,2m,.) | (x,0,0) | (bar{x},0,0) | (0,x,0) | (0,bar{x},0) | |||
| 4 | (k) | (m,.,2m) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x},x,frac{1}{2}) | (x,bar{x},frac{1}{2}) | |||
| 4 | (j) | (m,.,2m) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,0) | (x,bar{x},0) | |||
| 4 | (i) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 2 | (h) | (4,m,m) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | |||||
| 2 | (g) | (4,m,m) | (0,0,z) | (0,0,bar{z}) | |||||
| 2 | (f) | (m,mm,.) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (e) | (m,mm,.) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||||
| 1 | (d) | (4/m,m,m) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 1 | (c) | (4/m,m,m) | (frac{1}{2},frac{1}{2},0) | ||||||
| 1 | (b) | (4/m,m,m) | (0,0,frac{1}{2}) | ||||||
| 1 | (a) | (4/m,m,m) | (0,0,0) | ||||||
| 401 | 124 | (P 4/m 2/c 2/c) | ((0,0,0)+) | ||||||
| 16 | (n) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}+frac{1}{2}) | (x,bar{y},bar{z}+frac{1}{2}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 8 | (m) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| (bar{x},y,frac{1}{2}) | (x,bar{y},frac{1}{2}) | (y,x,frac{1}{2}) | (bar{y},bar{x},frac{1}{2}) | ||||||
| 8 | (l) | (,.,2,.) | (x,frac{1}{2},frac{1}{4}) | (bar{x},frac{1}{2},frac{1}{4}) | (frac{1}{2},x,frac{1}{4}) | (frac{1}{2},bar{x},frac{1}{4}) | |||
| (bar{x},frac{1}{2},frac{3}{4}) | (x,frac{1}{2},frac{3}{4}) | (frac{1}{2},bar{x},frac{3}{4}) | (frac{1}{2},x,frac{3}{4}) | ||||||
| 8 | (k) | (,.,2,.) | (x,0,frac{1}{4}) | (bar{x},0,frac{1}{4}) | (0,x,frac{1}{4}) | (0,bar{x},frac{1}{4}) | |||
| (bar{x},0,frac{3}{4}) | (x,0,frac{3}{4}) | (0,bar{x},frac{3}{4}) | (0,x,frac{3}{4}) | ||||||
| 8 | (j) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (bar{x},x,frac{1}{4}) | (x,bar{x},frac{1}{4}) | |||
| (bar{x},bar{x},frac{3}{4}) | (x,x,frac{3}{4}) | (x,bar{x},frac{3}{4}) | (bar{x},x,frac{3}{4}) | ||||||
| 8 | (i) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,z+frac{1}{2}) | ||||||
| 4 | (h) | (4,.,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| 4 | (g) | (4,.,.) | (0,0,z) | (0,0,bar{z}+frac{1}{2}) | (0,0,bar{z}) | (0,0,z+frac{1}{2}) | |||
| 4 | (f) | (2,2,2) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{3}{4}) | |||
| 4 | (e) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||
| 2 | (d) | (4/m,.,.) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (c) | (4,2,2) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (b) | (4/m,.,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 2 | (a) | (4,2,2) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 402 | 125 | (P 4/n 2/b 2/m) | ((0,0,0)+) | ||||||
| 16 | (n) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | (bar{y}+frac{1}{2},x+frac{1}{2},bar{z}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 8 | (m) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z) | (x+frac{1}{2},bar{x},z) | |||
| (bar{x},x+frac{1}{2},bar{z}) | (x,bar{x}+frac{1}{2},bar{z}) | (x+frac{1}{2},x,bar{z}) | (bar{x}+frac{1}{2},bar{x},bar{z}) | ||||||
| 8 | (l) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},frac{1}{2},frac{1}{2}) | (x+frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (frac{1}{2},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (k) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,x,0) | (0,bar{x},0) | |||
| (bar{x}+frac{1}{2},frac{1}{2},0) | (x+frac{1}{2},frac{1}{2},0) | (frac{1}{2},bar{x}+frac{1}{2},0) | (frac{1}{2},x+frac{1}{2},0) | ||||||
| 8 | (j) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x},x,frac{1}{2}) | (x,bar{x},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (i) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,0) | (x,bar{x},0) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},0) | (x+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},x+frac{1}{2},0) | ||||||
| 4 | (h) | (2,.mm) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 4 | (g) | (4,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},z) | |||
| 4 | (f) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{2}) | |||
| 4 | (e) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},0) | (frac{3}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},0) | |||
| 2 | (d) | (bar{4},2,m) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (c) | (bar{4},2,m) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (b) | (4,2,2) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (4,2,2) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 403 | 125 | (P 4/n 2/b 2/m) | ((0,0,0)+) | ||||||
| 16 | (n) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z) | (y,bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},y,bar{z}) | (x,bar{y}+frac{1}{2},bar{z}) | (y,x,bar{z}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}) | (bar{y},x+frac{1}{2},bar{z}) | ||||||
| (x+frac{1}{2},bar{y},z) | (bar{x},y+frac{1}{2},z) | (bar{y},bar{x},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 8 | (m) | (,.,.m) | (x,bar{x},z) | (bar{x}+frac{1}{2},x+frac{1}{2},z) | (x+frac{1}{2},x,z) | (bar{x},bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},bar{x},bar{z}) | (x,x+frac{1}{2},bar{z}) | (bar{x},x,bar{z}) | (x+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| 8 | (l) | (,.,2,.) | (x,frac{1}{4},frac{1}{2}) | (bar{x}+frac{1}{2},frac{1}{4},frac{1}{2}) | (frac{1}{4},x,frac{1}{2}) | (frac{1}{4},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x},frac{3}{4},frac{1}{2}) | (x+frac{1}{2},frac{3}{4},frac{1}{2}) | (frac{3}{4},bar{x},frac{1}{2}) | (frac{3}{4},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (k) | (,.,2,.) | (x,frac{1}{4},0) | (bar{x}+frac{1}{2},frac{1}{4},0) | (frac{1}{4},x,0) | (frac{1}{4},bar{x}+frac{1}{2},0) | |||
| (bar{x},frac{3}{4},0) | (x+frac{1}{2},frac{3}{4},0) | (frac{3}{4},bar{x},0) | (frac{3}{4},x+frac{1}{2},0) | ||||||
| 8 | (j) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},x,frac{1}{2}) | (x,bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x},bar{x},frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x},frac{1}{2}) | (bar{x},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (i) | (,.,.,2) | (x,x,0) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},x,0) | (x,bar{x}+frac{1}{2},0) | |||
| (bar{x},bar{x},0) | (x+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},bar{x},0) | (bar{x},x+frac{1}{2},0) | ||||||
| 4 | (h) | (2,.mm) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z) | (frac{3}{4},frac{1}{4},bar{z}) | (frac{1}{4},frac{3}{4},bar{z}) | |||
| 4 | (g) | (4,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{1}{4},frac{1}{4},bar{z}) | (frac{3}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{3}{4},z) | |||
| 4 | (f) | (,.,.,2/m) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| 4 | (e) | (,.,.,2/m) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| 2 | (d) | (bar{4},2,m) | (frac{3}{4},frac{1}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{2}) | |||||
| 2 | (c) | (bar{4},2,m) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},0) | |||||
| 2 | (b) | (4,2,2) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},frac{1}{2}) | |||||
| 2 | (a) | (4,2,2) | (frac{1}{4},frac{1}{4},0) | (frac{3}{4},frac{3}{4},0) | |||||
| 404 | 126 | (P 4/n 2/n 2/c) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (j) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},frac{1}{2},0) | (x+frac{1}{2},frac{1}{2},0) | (frac{1}{2},bar{x}+frac{1}{2},0) | (frac{1}{2},x+frac{1}{2},0) | ||||||
| 8 | (i) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (0,x,0) | (0,bar{x},0) | |||
| (bar{x}+frac{1}{2},frac{1}{2},frac{1}{2}) | (x+frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (frac{1}{2},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (h) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,0) | (x,bar{x},0) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (g) | (2,.,.) | (frac{1}{2},0,z) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},bar{z}) | |||
| (0,frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,z+frac{1}{2}) | ||||||
| 8 | (f) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||
| (frac{3}{4},frac{1}{4},frac{3}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | ||||||
| 4 | (e) | (4,.,.) | (0,0,z) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| 4 | (d) | (bar{4},.,.) | (frac{1}{2},0,frac{1}{4}) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | (0,frac{1}{2},frac{3}{4}) | |||
| 4 | (c) | (2,2,2) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||
| 2 | (b) | (4,2,2) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (4,2,2) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 405 | 126 | (P 4/n 2/n 2/c) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z) | (y,bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{1}{2}) | (x,bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,x,bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}) | (bar{y},x+frac{1}{2},bar{z}) | ||||||
| (x+frac{1}{2},bar{y},z+frac{1}{2}) | (bar{x},y+frac{1}{2},z+frac{1}{2}) | (bar{y},bar{x},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (j) | (,.,2,.) | (x,frac{3}{4},frac{1}{4}) | (bar{x}+frac{1}{2},frac{3}{4},frac{1}{4}) | (frac{3}{4},x,frac{1}{4}) | (frac{3}{4},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x},frac{1}{4},frac{3}{4}) | (x+frac{1}{2},frac{1}{4},frac{3}{4}) | (frac{1}{4},bar{x},frac{3}{4}) | (frac{1}{4},x+frac{1}{2},frac{3}{4}) | ||||||
| 8 | (i) | (,.,2,.) | (x,frac{1}{4},frac{1}{4}) | (bar{x}+frac{1}{2},frac{1}{4},frac{1}{4}) | (frac{1}{4},x,frac{1}{4}) | (frac{1}{4},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x},frac{3}{4},frac{3}{4}) | (x+frac{1}{2},frac{3}{4},frac{3}{4}) | (frac{3}{4},bar{x},frac{3}{4}) | (frac{3}{4},x+frac{1}{2},frac{3}{4}) | ||||||
| 8 | (h) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{1}{4}) | (x,bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x},bar{x},frac{3}{4}) | (x+frac{1}{2},x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | (bar{x},x+frac{1}{2},frac{3}{4}) | ||||||
| 8 | (g) | (2,.,.) | (frac{1}{4},frac{3}{4},z) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{1}{4},bar{z}+frac{1}{2}) | |||
| (frac{3}{4},frac{1}{4},bar{z}) | (frac{1}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{1}{4},z+frac{1}{2}) | (frac{1}{4},frac{3}{4},z+frac{1}{2}) | ||||||
| 8 | (f) | (bar{1}) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 4 | (e) | (4,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{1}{4},frac{1}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{3}{4},z+frac{1}{2}) | |||
| 4 | (d) | (bar{4},.,.) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||
| 4 | (c) | (2,2,2) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||
| 2 | (b) | (4,2,2) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | |||||
| 2 | (a) | (4,2,2) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | |||||
| 406 | 127 | (P 4/m 2_1/b m) | ((0,0,0)+) | ||||||
| 16 | (l) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (y+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 8 | (k) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z) | (x+frac{1}{2},bar{x},z) | |||
| (bar{x}+frac{1}{2},x,bar{z}) | (x+frac{1}{2},bar{x},bar{z}) | (x,x+frac{1}{2},bar{z}) | (bar{x},bar{x}+frac{1}{2},bar{z}) | ||||||
| 8 | (j) | (m,.,.) | (x,y,frac{1}{2}) | (bar{x},bar{y},frac{1}{2}) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (i) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},0) | (x+frac{1}{2},bar{y}+frac{1}{2},0) | (y+frac{1}{2},x+frac{1}{2},0) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},0) | ||||||
| 4 | (h) | (m,.,2m) | (x,x+frac{1}{2},frac{1}{2}) | (bar{x},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},x,frac{1}{2}) | (x+frac{1}{2},bar{x},frac{1}{2}) | |||
| 4 | (g) | (m,.,2m) | (x,x+frac{1}{2},0) | (bar{x},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},x,0) | (x+frac{1}{2},bar{x},0) | |||
| 4 | (f) | (2,.mm) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},bar{z}) | |||
| 4 | (e) | (4,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},bar{z}) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},z) | |||
| 2 | (d) | (m,.mm) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (c) | (m,.mm) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (b) | (4/m,.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (4/m,.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 407 | 128 | (P 4/m 2_1/n c) | ((0,0,0)+) | ||||||
| 16 | (i) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (h) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (g) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{1}{4}) | (x+frac{1}{2},bar{x},frac{1}{4}) | |||
| (bar{x},bar{x}+frac{1}{2},frac{3}{4}) | (x,x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | ||||||
| 8 | (f) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | |||
| (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},z+frac{1}{2}) | ||||||
| 4 | (e) | (4,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| 4 | (d) | (2,.,22) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{3}{4}) | |||
| 4 | (c) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| 2 | (b) | (4/m,.,.) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (4/m,.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 408 | 129 | (P 4/n 2_1/m m) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z) | (y+frac{1}{2},bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 8 | (j) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x},x+frac{1}{2},z) | (x,bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},x,bar{z}) | (x+frac{1}{2},bar{x},bar{z}) | (x+frac{1}{2},x,bar{z}) | (bar{x}+frac{1}{2},bar{x},bar{z}) | ||||||
| 8 | (i) | (,.m,.) | (0,y,z) | (0,bar{y},z) | (bar{y}+frac{1}{2},frac{1}{2},z) | (y+frac{1}{2},frac{1}{2},z) | |||
| (frac{1}{2},y+frac{1}{2},bar{z}) | (frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (y,0,bar{z}) | (bar{y},0,bar{z}) | ||||||
| 8 | (h) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x,bar{x},frac{1}{2}) | (bar{x},x,frac{1}{2}) | ||||||
| 8 | (g) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},bar{x}+frac{1}{2},0) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},0) | (x+frac{1}{2},x+frac{1}{2},0) | (x,bar{x},0) | (bar{x},x,0) | ||||||
| 4 | (f) | (2,mm,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}) | (0,0,bar{z}) | |||
| 4 | (e) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||
| 4 | (d) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},0) | (frac{3}{4},frac{3}{4},0) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},0) | |||
| 2 | (c) | (4,m,m) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}) | |||||
| 2 | (b) | (bar{4},m,2) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (bar{4},m,2) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | |||||
| 409 | 129 | (P 4/n 2_1/m m) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z) | (y,bar{x}+frac{1}{2},z) | |||
| (bar{x},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y},bar{z}) | (y+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}) | (bar{y},x+frac{1}{2},bar{z}) | ||||||
| (x,bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y,z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y,x,z) | ||||||
| 8 | (j) | (,.,.m) | (x,x,z) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z) | (x,bar{x}+frac{1}{2},z) | |||
| (bar{x},x+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{x},bar{z}) | (x+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{x},bar{x},bar{z}) | ||||||
| 8 | (i) | (,.m,.) | (frac{1}{4},y,z) | (frac{1}{4},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},frac{1}{4},z) | (y,frac{1}{4},z) | |||
| (frac{3}{4},y+frac{1}{2},bar{z}) | (frac{3}{4},bar{y},bar{z}) | (y+frac{1}{2},frac{3}{4},bar{z}) | (bar{y},frac{3}{4},bar{z}) | ||||||
| 8 | (h) | (,.,.,2) | (x,bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},x,frac{1}{2}) | (bar{x},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x},x,frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},bar{x},frac{1}{2}) | (x,x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (g) | (,.,.,2) | (x,bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},x,0) | (bar{x},bar{x}+frac{1}{2},0) | |||
| (bar{x},x,0) | (x+frac{1}{2},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},bar{x},0) | (x,x+frac{1}{2},0) | ||||||
| 4 | (f) | (2,mm,.) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z) | (frac{1}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{1}{4},bar{z}) | |||
| 4 | (e) | (,.,.,2/m) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| 4 | (d) | (,.,.,2/m) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| 2 | (c) | (4,m,m) | (frac{1}{4},frac{1}{4},z) | (frac{3}{4},frac{3}{4},bar{z}) | |||||
| 2 | (b) | (bar{4},m,2) | (frac{3}{4},frac{1}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{2}) | |||||
| 2 | (a) | (bar{4},m,2) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},0) | |||||
| 410 | 130 | (P 4/n 2_1/c c) | ((0,0,0)+) | ||||||
| 16 | (g) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z) | (y+frac{1}{2},bar{x}+frac{1}{2},z) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (f) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},x+frac{1}{2},frac{3}{4}) | (x,bar{x},frac{3}{4}) | (bar{x},x,frac{3}{4}) | ||||||
| 8 | (e) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}+frac{1}{2}) | |||
| (frac{1}{2},frac{1}{2},bar{z}) | (0,0,bar{z}) | (0,0,z+frac{1}{2}) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (d) | (bar{1}) | (frac{1}{4},frac{1}{4},0) | (frac{3}{4},frac{3}{4},0) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},0) | |||
| (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},frac{1}{2}) | ||||||
| 4 | (c) | (4,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},z+frac{1}{2}) | |||
| 4 | (b) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (0,0,frac{1}{2}) | |||
| 4 | (a) | (2,.,22) | (0,0,frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | (0,0,frac{3}{4}) | |||
| 411 | 130 | (P 4/n 2_1/c c) | ((0,0,0)+) | ||||||
| 16 | (g) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z) | (y,bar{x}+frac{1}{2},z) | |||
| (bar{x},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y},bar{z}+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}) | (bar{y},x+frac{1}{2},bar{z}) | ||||||
| (x,bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y,z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 8 | (f) | (,.,.,2) | (x,bar{x},frac{1}{4}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},x,frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x},x,frac{3}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | (bar{x}+frac{1}{2},bar{x},frac{3}{4}) | (x,x+frac{1}{2},frac{3}{4}) | ||||||
| 8 | (e) | (2,.,.) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z) | (frac{1}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{1}{4},bar{z}+frac{1}{2}) | |||
| (frac{1}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{1}{4},bar{z}) | (frac{3}{4},frac{1}{4},z+frac{1}{2}) | (frac{1}{4},frac{3}{4},z+frac{1}{2}) | ||||||
| 8 | (d) | (bar{1}) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (0,0,frac{1}{2}) | ||||||
| 4 | (c) | (4,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{3}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{3}{4},bar{z}) | (frac{1}{4},frac{1}{4},z+frac{1}{2}) | |||
| 4 | (b) | (bar{4},.,.) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},0) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||
| 4 | (a) | (2,.,22) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||
| 412 | 131 | (P 4_2/m 2/m 2/c) | ((0,0,0)+) | ||||||
| 16 | (r) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}+frac{1}{2}) | (bar{y},x,bar{z}+frac{1}{2}) | ||||||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 8 | (q) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| (bar{x},y,0) | (x,bar{y},0) | (y,x,frac{1}{2}) | (bar{y},bar{x},frac{1}{2}) | ||||||
| 8 | (p) | (,.m,.) | (frac{1}{2},y,z) | (frac{1}{2},bar{y},z) | (bar{y},frac{1}{2},z+frac{1}{2}) | (y,frac{1}{2},z+frac{1}{2}) | |||
| (frac{1}{2},y,bar{z}) | (frac{1}{2},bar{y},bar{z}) | (y,frac{1}{2},bar{z}+frac{1}{2}) | (bar{y},frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| 8 | (o) | (,.m,.) | (0,y,z) | (0,bar{y},z) | (bar{y},0,z+frac{1}{2}) | (y,0,z+frac{1}{2}) | |||
| (0,y,bar{z}) | (0,bar{y},bar{z}) | (y,0,bar{z}+frac{1}{2}) | (bar{y},0,bar{z}+frac{1}{2}) | ||||||
| 8 | (n) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (bar{x},x,frac{3}{4}) | (x,bar{x},frac{3}{4}) | |||
| (bar{x},bar{x},frac{3}{4}) | (x,x,frac{3}{4}) | (x,bar{x},frac{1}{4}) | (bar{x},x,frac{1}{4}) | ||||||
| 4 | (m) | (m,2m,.) | (x,frac{1}{2},0) | (bar{x},frac{1}{2},0) | (frac{1}{2},x,frac{1}{2}) | (frac{1}{2},bar{x},frac{1}{2}) | |||
| 4 | (l) | (m,2m,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (0,x,0) | (0,bar{x},0) | |||
| 4 | (k) | (m,2m,.) | (x,frac{1}{2},frac{1}{2}) | (bar{x},frac{1}{2},frac{1}{2}) | (frac{1}{2},x,0) | (frac{1}{2},bar{x},0) | |||
| 4 | (j) | (m,2m,.) | (x,0,0) | (bar{x},0,0) | (0,x,frac{1}{2}) | (0,bar{x},frac{1}{2}) | |||
| 4 | (i) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 4 | (h) | (2,mm,.) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (g) | (2,mm,.) | (0,0,z) | (0,0,z+frac{1}{2}) | (0,0,bar{z}) | (0,0,bar{z}+frac{1}{2}) | |||
| 2 | (f) | (bar{4},m,2) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (e) | (bar{4},m,2) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 2 | (d) | (m,mm,.) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,0) | |||||
| 2 | (c) | (m,mm,.) | (0,frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | |||||
| 2 | (b) | (m,mm,.) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (a) | (m,mm,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 413 | 132 | (P 4_2/m 2/c 2/m) | ((0,0,0)+) | ||||||
| 16 | (p) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (bar{x},y,bar{z}+frac{1}{2}) | (x,bar{y},bar{z}+frac{1}{2}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}+frac{1}{2}) | (bar{y},x,bar{z}+frac{1}{2}) | ||||||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 8 | (o) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x},x,z+frac{1}{2}) | (x,bar{x},z+frac{1}{2}) | |||
| (bar{x},x,bar{z}+frac{1}{2}) | (x,bar{x},bar{z}+frac{1}{2}) | (x,x,bar{z}) | (bar{x},bar{x},bar{z}) | ||||||
| 8 | (n) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| (bar{x},y,frac{1}{2}) | (x,bar{y},frac{1}{2}) | (y,x,0) | (bar{y},bar{x},0) | ||||||
| 8 | (m) | (,.,2,.) | (x,frac{1}{2},frac{1}{4}) | (bar{x},frac{1}{2},frac{1}{4}) | (frac{1}{2},x,frac{3}{4}) | (frac{1}{2},bar{x},frac{3}{4}) | |||
| (bar{x},frac{1}{2},frac{3}{4}) | (x,frac{1}{2},frac{3}{4}) | (frac{1}{2},bar{x},frac{1}{4}) | (frac{1}{2},x,frac{1}{4}) | ||||||
| 8 | (l) | (,.,2,.) | (x,0,frac{1}{4}) | (bar{x},0,frac{1}{4}) | (0,x,frac{3}{4}) | (0,bar{x},frac{3}{4}) | |||
| (bar{x},0,frac{3}{4}) | (x,0,frac{3}{4}) | (0,bar{x},frac{1}{4}) | (0,x,frac{1}{4}) | ||||||
| 8 | (k) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | |||
| (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,z) | ||||||
| 4 | (j) | (m,.,2m) | (x,x,frac{1}{2}) | (bar{x},bar{x},frac{1}{2}) | (bar{x},x,0) | (x,bar{x},0) | |||
| 4 | (i) | (m,.,2m) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,frac{1}{2}) | (x,bar{x},frac{1}{2}) | |||
| 4 | (h) | (2,.mm) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | |||
| 4 | (g) | (2,.mm) | (0,0,z) | (0,0,z+frac{1}{2}) | (0,0,bar{z}+frac{1}{2}) | (0,0,bar{z}) | |||
| 4 | (f) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,0) | |||
| 4 | (e) | (2,2,2) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{1}{4}) | |||
| 2 | (d) | (bar{4},2,m) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | |||||
| 2 | (c) | (m,.mm) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 2 | (b) | (bar{4},2,m) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 2 | (a) | (m,.mm) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 414 | 133 | (P 4_2/n 2/b 2/c) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x},y,bar{z}+frac{1}{2}) | (x,bar{y},bar{z}+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 8 | (j) | (,.,.,2) | (x,x+frac{1}{2},0) | (bar{x},bar{x}+frac{1}{2},0) | (bar{x},x+frac{1}{2},frac{1}{2}) | (x,bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},bar{x},frac{1}{2}) | (x+frac{1}{2},x,frac{1}{2}) | (x+frac{1}{2},bar{x},0) | (bar{x}+frac{1}{2},x,0) | ||||||
| 8 | (i) | (,.,2,.) | (x,0,frac{3}{4}) | (bar{x},0,frac{3}{4}) | (frac{1}{2},x+frac{1}{2},frac{1}{4}) | (frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x}+frac{1}{2},frac{1}{2},frac{3}{4}) | (x+frac{1}{2},frac{1}{2},frac{3}{4}) | (0,bar{x},frac{1}{4}) | (0,x,frac{1}{4}) | ||||||
| 8 | (h) | (,.,2,.) | (x,0,frac{1}{4}) | (bar{x},0,frac{1}{4}) | (frac{1}{2},x+frac{1}{2},frac{3}{4}) | (frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | |||
| (bar{x}+frac{1}{2},frac{1}{2},frac{1}{4}) | (x+frac{1}{2},frac{1}{2},frac{1}{4}) | (0,bar{x},frac{3}{4}) | (0,x,frac{3}{4}) | ||||||
| 8 | (g) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (0,0,bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | |||
| (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},z) | (0,0,z+frac{1}{2}) | ||||||
| 8 | (f) | (2,.,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | (0,frac{1}{2},bar{z}) | |||
| (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,z) | (frac{1}{2},0,z+frac{1}{2}) | ||||||
| 8 | (e) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||
| (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | ||||||
| 4 | (d) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||
| 4 | (c) | (2,.,22) | (0,frac{1}{2},0) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{2},0,0) | |||
| 4 | (b) | (2,2,2) | (0,0,frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (0,0,frac{3}{4}) | |||
| 4 | (a) | (2,2,2) | (0,frac{1}{2},frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | |||
| 415 | 133 | (P 4_2/n 2/b 2/c) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z+frac{1}{2}) | (y,bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y,bar{z}) | (x,bar{y}+frac{1}{2},bar{z}) | (y,x,bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | (bar{y},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y},z) | (bar{x},y+frac{1}{2},z) | (bar{y},bar{x},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (j) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | (x,bar{x}+frac{1}{2},frac{3}{4}) | |||
| (bar{x},bar{x},frac{3}{4}) | (x+frac{1}{2},x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x},frac{1}{4}) | (bar{x},x+frac{1}{2},frac{1}{4}) | ||||||
| 8 | (i) | (,.,2,.) | (x,frac{1}{4},frac{1}{2}) | (bar{x}+frac{1}{2},frac{1}{4},frac{1}{2}) | (frac{1}{4},x,0) | (frac{1}{4},bar{x}+frac{1}{2},0) | |||
| (bar{x},frac{3}{4},frac{1}{2}) | (x+frac{1}{2},frac{3}{4},frac{1}{2}) | (frac{3}{4},bar{x},0) | (frac{3}{4},x+frac{1}{2},0) | ||||||
| 8 | (h) | (,.,2,.) | (x,frac{1}{4},0) | (bar{x}+frac{1}{2},frac{1}{4},0) | (frac{1}{4},x,frac{1}{2}) | (frac{1}{4},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x},frac{3}{4},0) | (x+frac{1}{2},frac{3}{4},0) | (frac{3}{4},bar{x},frac{1}{2}) | (frac{3}{4},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (g) | (2,.,.) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z+frac{1}{2}) | (frac{3}{4},frac{1}{4},bar{z}) | (frac{1}{4},frac{3}{4},bar{z}+frac{1}{2}) | |||
| (frac{1}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{1}{4},bar{z}+frac{1}{2}) | (frac{1}{4},frac{3}{4},z) | (frac{3}{4},frac{1}{4},z+frac{1}{2}) | ||||||
| 8 | (f) | (2,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{1}{4},frac{1}{4},z+frac{1}{2}) | (frac{1}{4},frac{1}{4},bar{z}) | (frac{1}{4},frac{1}{4},bar{z}+frac{1}{2}) | |||
| (frac{3}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{3}{4},z) | (frac{3}{4},frac{3}{4},z+frac{1}{2}) | ||||||
| 8 | (e) | (bar{1}) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| (frac{1}{2},0,0) | (0,frac{1}{2},0) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | ||||||
| 4 | (d) | (bar{4},.,.) | (frac{3}{4},frac{1}{4},frac{3}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | |||
| 4 | (c) | (2,.,22) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | |||
| 4 | (b) | (2,2,2) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||
| 4 | (a) | (2,2,2) | (frac{1}{4},frac{1}{4},0) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},0) | (frac{3}{4},frac{3}{4},frac{1}{2}) | |||
| 416 | 134 | (P 4_2/n 2/n 2/m) | ((0,0,0)+) | ||||||
| 16 | (n) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 8 | (m) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x},x,bar{z}) | (x,bar{x},bar{z}) | (x+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| 8 | (l) | (,.,.,2) | (x,x+frac{1}{2},frac{3}{4}) | (bar{x},bar{x}+frac{1}{2},frac{3}{4}) | (bar{x},x+frac{1}{2},frac{1}{4}) | (x,bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x}+frac{1}{2},bar{x},frac{3}{4}) | (x+frac{1}{2},x,frac{3}{4}) | (x+frac{1}{2},bar{x},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{1}{4}) | ||||||
| 8 | (k) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x},x+frac{1}{2},frac{3}{4}) | (x,bar{x}+frac{1}{2},frac{3}{4}) | |||
| (bar{x}+frac{1}{2},bar{x},frac{1}{4}) | (x+frac{1}{2},x,frac{1}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | ||||||
| 8 | (j) | (,.,2,.) | (x,0,frac{1}{2}) | (bar{x},0,frac{1}{2}) | (frac{1}{2},x+frac{1}{2},0) | (frac{1}{2},bar{x}+frac{1}{2},0) | |||
| (bar{x}+frac{1}{2},frac{1}{2},0) | (x+frac{1}{2},frac{1}{2},0) | (0,bar{x},frac{1}{2}) | (0,x,frac{1}{2}) | ||||||
| 8 | (i) | (,.,2,.) | (x,0,0) | (bar{x},0,0) | (frac{1}{2},x+frac{1}{2},frac{1}{2}) | (frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},frac{1}{2},frac{1}{2}) | (x+frac{1}{2},frac{1}{2},frac{1}{2}) | (0,bar{x},0) | (0,x,0) | ||||||
| 8 | (h) | (2,.,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (0,frac{1}{2},bar{z}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | |||
| (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,z+frac{1}{2}) | (frac{1}{2},0,z) | ||||||
| 4 | (g) | (2,.mm) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 4 | (f) | (,.,.,2/m) | (frac{3}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||
| 4 | (e) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||
| 4 | (d) | (2,.,22) | (0,frac{1}{2},frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | |||
| 4 | (c) | (2,2,2) | (0,frac{1}{2},0) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{2},0,0) | |||
| 2 | (b) | (bar{4},2,m) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (bar{4},2,m) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 417 | 134 | (P 4_2/n 2/n 2/m) | ((0,0,0)+) | ||||||
| 16 | (n) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z+frac{1}{2}) | (y,bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{1}{2}) | (x,bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,x,bar{z}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | (bar{y},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y},z+frac{1}{2}) | (bar{x},y+frac{1}{2},z+frac{1}{2}) | (bar{y},bar{x},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 8 | (m) | (,.,.m) | (x,bar{x},z) | (bar{x}+frac{1}{2},x+frac{1}{2},z) | (x+frac{1}{2},x,z+frac{1}{2}) | (bar{x},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | (x,x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{x},x,bar{z}) | (x+frac{1}{2},bar{x}+frac{1}{2},bar{z}) | ||||||
| 8 | (l) | (,.,.,2) | (x,x,frac{1}{2}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},x,0) | (x,bar{x}+frac{1}{2},0) | |||
| (bar{x},bar{x},frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x},0) | (bar{x},x+frac{1}{2},0) | ||||||
| 8 | (k) | (,.,.,2) | (x,x,0) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},x,frac{1}{2}) | (x,bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x},bar{x},0) | (x+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},bar{x},frac{1}{2}) | (bar{x},x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (j) | (,.,2,.) | (x,frac{1}{4},frac{1}{4}) | (bar{x}+frac{1}{2},frac{1}{4},frac{1}{4}) | (frac{1}{4},x,frac{3}{4}) | (frac{1}{4},bar{x}+frac{1}{2},frac{3}{4}) | |||
| (bar{x},frac{3}{4},frac{3}{4}) | (x+frac{1}{2},frac{3}{4},frac{3}{4}) | (frac{3}{4},bar{x},frac{1}{4}) | (frac{3}{4},x+frac{1}{2},frac{1}{4}) | ||||||
| 8 | (i) | (,.,2,.) | (x,frac{1}{4},frac{3}{4}) | (bar{x}+frac{1}{2},frac{1}{4},frac{3}{4}) | (frac{1}{4},x,frac{1}{4}) | (frac{1}{4},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x},frac{3}{4},frac{1}{4}) | (x+frac{1}{2},frac{3}{4},frac{1}{4}) | (frac{3}{4},bar{x},frac{3}{4}) | (frac{3}{4},x+frac{1}{2},frac{3}{4}) | ||||||
| 8 | (h) | (2,.,.) | (frac{1}{4},frac{1}{4},z) | (frac{1}{4},frac{1}{4},z+frac{1}{2}) | (frac{1}{4},frac{1}{4},bar{z}+frac{1}{2}) | (frac{1}{4},frac{1}{4},bar{z}) | |||
| (frac{3}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{3}{4},z+frac{1}{2}) | (frac{3}{4},frac{3}{4},z) | ||||||
| 4 | (g) | (2,.mm) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z+frac{1}{2}) | (frac{3}{4},frac{1}{4},bar{z}+frac{1}{2}) | (frac{1}{4},frac{3}{4},bar{z}) | |||
| 4 | (f) | (,.,.,2/m) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| 4 | (e) | (,.,.,2/m) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| 4 | (d) | (2,.,22) | (frac{1}{4},frac{1}{4},0) | (frac{1}{4},frac{1}{4},frac{1}{2}) | (frac{3}{4},frac{3}{4},0) | (frac{3}{4},frac{3}{4},frac{1}{2}) | |||
| 4 | (c) | (2,2,2) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | |||
| 2 | (b) | (bar{4},2,m) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | |||||
| 2 | (a) | (bar{4},2,m) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||||
| 418 | 135 | (P 4_2/m 2_1/b 2/c) | ((0,0,0)+) | ||||||
| 16 | (i) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z+frac{1}{2}) | (y,bar{x},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}+frac{1}{2}) | (bar{y},x,bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y+frac{1}{2},z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (h) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,frac{1}{2}) | (y,bar{x},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},0) | (x+frac{1}{2},bar{y}+frac{1}{2},0) | (y+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (g) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | |||
| (bar{x},bar{x}+frac{1}{2},frac{3}{4}) | (x,x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{1}{4}) | ||||||
| 8 | (f) | (2,.,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{2}) | (frac{1}{2},0,bar{z}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | |||
| (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,z) | (0,frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (e) | (2,.,.) | (0,0,z) | (0,0,z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| (0,0,bar{z}) | (0,0,bar{z}+frac{1}{2}) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | ||||||
| 4 | (d) | (2,.,22) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{1}{4}) | |||
| 4 | (c) | (2/m,.,.) | (0,frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{2},0,0) | (0,frac{1}{2},frac{1}{2}) | |||
| 4 | (b) | (bar{4},.,.) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | (frac{1}{2},frac{1}{2},frac{1}{4}) | |||
| 4 | (a) | (2/m,.,.) | (0,0,0) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||
| 419 | 136 | (P 4_2/m 2_1/n 2/m) | ((0,0,0)+) | ||||||
| 16 | (k) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y}+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y+frac{1}{2},z+frac{1}{2}) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 8 | (j) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | (x,x,bar{z}) | (bar{x},bar{x},bar{z}) | ||||||
| 8 | (i) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},frac{1}{2}) | (y,x,0) | (bar{y},bar{x},0) | ||||||
| 8 | (h) | (2,.,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | |||
| (0,frac{1}{2},bar{z}) | (0,frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},0,z+frac{1}{2}) | (frac{1}{2},0,z) | ||||||
| 4 | (g) | (m,.,2m) | (x,bar{x},0) | (bar{x},x,0) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| 4 | (f) | (m,.,2m) | (x,x,0) | (bar{x},bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| 4 | (e) | (2,.mm) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | |||
| 4 | (d) | (bar{4},.,.) | (0,frac{1}{2},frac{1}{4}) | (0,frac{1}{2},frac{3}{4}) | (frac{1}{2},0,frac{1}{4}) | (frac{1}{2},0,frac{3}{4}) | |||
| 4 | (c) | (2/m,.,.) | (0,frac{1}{2},0) | (0,frac{1}{2},frac{1}{2}) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{2},0,0) | |||
| 2 | (b) | (m,.mm) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (m,.mm) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 420 | 137 | (P 4_2/n 2_1/m 2/c) | ((0,0,0)+) | ||||||
| 16 | (h) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | ||||||
| 8 | (g) | (,.m,.) | (0,y,z) | (0,bar{y},z) | (bar{y}+frac{1}{2},frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},frac{1}{2},z+frac{1}{2}) | |||
| (frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (y,0,bar{z}) | (bar{y},0,bar{z}) | ||||||
| 8 | (f) | (,.,.,2) | (x,x,0) | (bar{x},bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x,bar{x},0) | (bar{x},x,0) | ||||||
| 8 | (e) | (bar{1}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||
| (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | ||||||
| 4 | (d) | (2,mm,.) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}) | |||
| 4 | (c) | (2,mm,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | |||
| 2 | (b) | (bar{4},m,2) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | |||||
| 2 | (a) | (bar{4},m,2) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | |||||
| 421 | 137 | (P 4_2/n 2_1/m 2/c) | ((0,0,0)+) | ||||||
| 16 | (h) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z+frac{1}{2}) | (y,bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y},bar{z}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | (bar{y},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x,bar{y}+frac{1}{2},z) | (bar{x}+frac{1}{2},y,z) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 8 | (g) | (,.m,.) | (frac{1}{4},y,z) | (frac{1}{4},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},frac{1}{4},z+frac{1}{2}) | (y,frac{1}{4},z+frac{1}{2}) | |||
| (frac{3}{4},y+frac{1}{2},bar{z}) | (frac{3}{4},bar{y},bar{z}) | (y+frac{1}{2},frac{3}{4},bar{z}+frac{1}{2}) | (bar{y},frac{3}{4},bar{z}+frac{1}{2}) | ||||||
| 8 | (f) | (,.,.,2) | (x,bar{x},frac{1}{4}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},x,frac{3}{4}) | (bar{x},bar{x}+frac{1}{2},frac{3}{4}) | |||
| (bar{x},x,frac{3}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | (bar{x}+frac{1}{2},bar{x},frac{1}{4}) | (x,x+frac{1}{2},frac{1}{4}) | ||||||
| 8 | (e) | (bar{1}) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| (0,frac{1}{2},0) | (frac{1}{2},0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (0,0,frac{1}{2}) | ||||||
| 4 | (d) | (2,mm,.) | (frac{1}{4},frac{1}{4},z) | (frac{1}{4},frac{1}{4},z+frac{1}{2}) | (frac{3}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{3}{4},bar{z}+frac{1}{2}) | |||
| 4 | (c) | (2,mm,.) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z+frac{1}{2}) | (frac{1}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{1}{4},bar{z}+frac{1}{2}) | |||
| 2 | (b) | (bar{4},m,2) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | |||||
| 2 | (a) | (bar{4},m,2) | (frac{3}{4},frac{1}{4},frac{3}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||||
| 422 | 138 | (P 4_2/n 2_1/c 2/m) | ((0,0,0)+) | ||||||
| 16 | (j) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y}+frac{1}{2},x+frac{1}{2},z+frac{1}{2}) | (y+frac{1}{2},bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},y+frac{1}{2},bar{z}) | (x+frac{1}{2},bar{y}+frac{1}{2},bar{z}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x}+frac{1}{2},bar{y}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},y+frac{1}{2},bar{z}+frac{1}{2}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y+frac{1}{2},x+frac{1}{2},z) | ||||||
| 8 | (i) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x},x+frac{1}{2},z+frac{1}{2}) | (x,bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x}+frac{1}{2},x,bar{z}) | (x+frac{1}{2},bar{x},bar{z}) | (x+frac{1}{2},x,bar{z}+frac{1}{2}) | (bar{x}+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | ||||||
| 8 | (h) | (,.,.,2) | (x,x,frac{3}{4}) | (bar{x},bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},x+frac{1}{2},frac{3}{4}) | (x,bar{x},frac{1}{4}) | (bar{x},x,frac{1}{4}) | ||||||
| 8 | (g) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | |||
| (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},x+frac{1}{2},frac{1}{4}) | (x,bar{x},frac{3}{4}) | (bar{x},x,frac{3}{4}) | ||||||
| 8 | (f) | (2,.,.) | (0,0,z) | (frac{1}{2},frac{1}{2},z+frac{1}{2}) | (frac{1}{2},frac{1}{2},bar{z}) | (0,0,bar{z}+frac{1}{2}) | |||
| (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (0,0,bar{z}) | (0,0,z+frac{1}{2}) | (frac{1}{2},frac{1}{2},z) | ||||||
| 4 | (e) | (2,.mm) | (0,frac{1}{2},z) | (0,frac{1}{2},z+frac{1}{2}) | (frac{1}{2},0,bar{z}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 4 | (d) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{3}{4}) | (frac{3}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | |||
| 4 | (c) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{3}{4}) | |||
| 4 | (b) | (bar{4},.,.) | (0,0,0) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},frac{1}{2},0) | (0,0,frac{1}{2}) | |||
| 4 | (a) | (2,.,22) | (0,0,frac{1}{4}) | (frac{1}{2},frac{1}{2},frac{3}{4}) | (frac{1}{2},frac{1}{2},frac{1}{4}) | (0,0,frac{3}{4}) | |||
| 423 | 138 | (P 4_2/n 2_1/c 2/m) | ((0,0,0)+) | ||||||
| 16 | (j) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{y}+frac{1}{2},x,z+frac{1}{2}) | (y,bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x},y+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{y},bar{z}+frac{1}{2}) | (y+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y+frac{1}{2},bar{z}) | (y+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | (bar{y},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x,bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x}+frac{1}{2},y,z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x}+frac{1}{2},z) | (y,x,z) | ||||||
| 8 | (i) | (,.,.m) | (x,x,z) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z+frac{1}{2}) | (x,bar{x}+frac{1}{2},z+frac{1}{2}) | |||
| (bar{x},x+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | (x+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{x},bar{x},bar{z}) | ||||||
| 8 | (h) | (,.,.,2) | (x,bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},0) | (x+frac{1}{2},x,frac{1}{2}) | (bar{x},bar{x}+frac{1}{2},frac{1}{2}) | |||
| (bar{x},x,0) | (x+frac{1}{2},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},bar{x},frac{1}{2}) | (x,x+frac{1}{2},frac{1}{2}) | ||||||
| 8 | (g) | (,.,.,2) | (x,bar{x},frac{1}{2}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},x,0) | (bar{x},bar{x}+frac{1}{2},0) | |||
| (bar{x},x,frac{1}{2}) | (x+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x}+frac{1}{2},bar{x},0) | (x,x+frac{1}{2},0) | ||||||
| 8 | (f) | (2,.,.) | (frac{3}{4},frac{1}{4},z) | (frac{1}{4},frac{3}{4},z+frac{1}{2}) | (frac{1}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{1}{4},bar{z}) | |||
| (frac{1}{4},frac{3}{4},bar{z}) | (frac{3}{4},frac{1}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{1}{4},z+frac{1}{2}) | (frac{1}{4},frac{3}{4},z) | ||||||
| 4 | (e) | (2,.mm) | (frac{1}{4},frac{1}{4},z) | (frac{1}{4},frac{1}{4},z+frac{1}{2}) | (frac{3}{4},frac{3}{4},bar{z}+frac{1}{2}) | (frac{3}{4},frac{3}{4},bar{z}) | |||
| 4 | (d) | (,.,.,2/m) | (0,0,0) | (frac{1}{2},frac{1}{2},0) | (frac{1}{2},0,frac{1}{2}) | (0,frac{1}{2},frac{1}{2}) | |||
| 4 | (c) | (,.,.,2/m) | (0,0,frac{1}{2}) | (frac{1}{2},frac{1}{2},frac{1}{2}) | (frac{1}{2},0,0) | (0,frac{1}{2},0) | |||
| 4 | (b) | (bar{4},.,.) | (frac{3}{4},frac{1}{4},frac{3}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | |||
| 4 | (a) | (2,.,22) | (frac{3}{4},frac{1}{4},0) | (frac{1}{4},frac{3}{4},frac{1}{2}) | (frac{1}{4},frac{3}{4},0) | (frac{3}{4},frac{1}{4},frac{1}{2}) | |||
| 424 | 139 | (I 4/m 2/m 2/m) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 32 | (o) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}) | (x,bar{y},bar{z}) | (y,x,bar{z}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z) | (bar{x},y,z) | (bar{y},bar{x},z) | (y,x,z) | ||||||
| 16 | (n) | (,.m,.) | (0,y,z) | (0,bar{y},z) | (bar{y},0,z) | (y,0,z) | |||
| (0,y,bar{z}) | (0,bar{y},bar{z}) | (y,0,bar{z}) | (bar{y},0,bar{z}) | ||||||
| 16 | (m) | (,.,.m) | (x,x,z) | (bar{x},bar{x},z) | (bar{x},x,z) | (x,bar{x},z) | |||
| (bar{x},x,bar{z}) | (x,bar{x},bar{z}) | (x,x,bar{z}) | (bar{x},bar{x},bar{z}) | ||||||
| 16 | (l) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| (bar{x},y,0) | (x,bar{y},0) | (y,x,0) | (bar{y},bar{x},0) | ||||||
| 16 | (k) | (,.,.,2) | (x,x+frac{1}{2},frac{1}{4}) | (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (bar{x}+frac{1}{2},x,frac{1}{4}) | (x+frac{1}{2},bar{x},frac{1}{4}) | |||
| (bar{x},bar{x}+frac{1}{2},frac{3}{4}) | (x,x+frac{1}{2},frac{3}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x,frac{3}{4}) | ||||||
| 8 | (j) | (m,2m,.) | (x,frac{1}{2},0) | (bar{x},frac{1}{2},0) | (frac{1}{2},x,0) | (frac{1}{2},bar{x},0) | |||
| 8 | (i) | (m,2m,.) | (x,0,0) | (bar{x},0,0) | (0,x,0) | (0,bar{x},0) | |||
| 8 | (h) | (m,.,2m) | (x,x,0) | (bar{x},bar{x},0) | (bar{x},x,0) | (x,bar{x},0) | |||
| 8 | (g) | (2,mm,.) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}) | (frac{1}{2},0,bar{z}) | |||
| 8 | (f) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||
| 4 | (e) | (4,m,m) | (0,0,z) | (0,0,bar{z}) | |||||
| 4 | (d) | (bar{4},m,2) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | |||||
| 4 | (c) | (m,mm,.) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 2 | (b) | (4/m,m,m) | (0,0,frac{1}{2}) | ||||||
| 2 | (a) | (4/m,m,m) | (0,0,0) | ||||||
| 425 | 140 | (I 4/m 2/c 2/m) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 32 | (m) | (1) | (x,y,z) | (bar{x},bar{y},z) | (bar{y},x,z) | (y,bar{x},z) | |||
| (bar{x},y,bar{z}+frac{1}{2}) | (x,bar{y},bar{z}+frac{1}{2}) | (y,x,bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y},bar{z}) | (x,y,bar{z}) | (y,bar{x},bar{z}) | (bar{y},x,bar{z}) | ||||||
| (x,bar{y},z+frac{1}{2}) | (bar{x},y,z+frac{1}{2}) | (bar{y},bar{x},z+frac{1}{2}) | (y,x,z+frac{1}{2}) | ||||||
| 16 | (l) | (,.,.m) | (x,x+frac{1}{2},z) | (bar{x},bar{x}+frac{1}{2},z) | (bar{x}+frac{1}{2},x,z) | (x+frac{1}{2},bar{x},z) | |||
| (bar{x},x+frac{1}{2},bar{z}+frac{1}{2}) | (x,bar{x}+frac{1}{2},bar{z}+frac{1}{2}) | (x+frac{1}{2},x,bar{z}+frac{1}{2}) | (bar{x}+frac{1}{2},bar{x},bar{z}+frac{1}{2}) | ||||||
| 16 | (k) | (m,.,.) | (x,y,0) | (bar{x},bar{y},0) | (bar{y},x,0) | (y,bar{x},0) | |||
| (bar{x},y,frac{1}{2}) | (x,bar{y},frac{1}{2}) | (y,x,frac{1}{2}) | (bar{y},bar{x},frac{1}{2}) | ||||||
| 16 | (j) | (,.,2,.) | (x,0,frac{1}{4}) | (bar{x},0,frac{1}{4}) | (0,x,frac{1}{4}) | (0,bar{x},frac{1}{4}) | |||
| (bar{x},0,frac{3}{4}) | (x,0,frac{3}{4}) | (0,bar{x},frac{3}{4}) | (0,x,frac{3}{4}) | ||||||
| 16 | (i) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x},bar{x},frac{1}{4}) | (bar{x},x,frac{1}{4}) | (x,bar{x},frac{1}{4}) | |||
| (bar{x},bar{x},frac{3}{4}) | (x,x,frac{3}{4}) | (x,bar{x},frac{3}{4}) | (bar{x},x,frac{3}{4}) | ||||||
| 8 | (h) | (m,.,2m) | (x,x+frac{1}{2},0) | (bar{x},bar{x}+frac{1}{2},0) | (bar{x}+frac{1}{2},x,0) | (x+frac{1}{2},bar{x},0) | |||
| 8 | (g) | (2,.mm) | (0,frac{1}{2},z) | (frac{1}{2},0,z) | (0,frac{1}{2},bar{z}+frac{1}{2}) | (frac{1}{2},0,bar{z}+frac{1}{2}) | |||
| 8 | (f) | (4,.,.) | (0,0,z) | (0,0,bar{z}+frac{1}{2}) | (0,0,bar{z}) | (0,0,z+frac{1}{2}) | |||
| 8 | (e) | (,.,.,2/m) | (frac{1}{4},frac{1}{4},frac{1}{4}) | (frac{3}{4},frac{3}{4},frac{1}{4}) | (frac{3}{4},frac{1}{4},frac{1}{4}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | |||
| 4 | (d) | (m,.mm) | (0,frac{1}{2},0) | (frac{1}{2},0,0) | |||||
| 4 | (c) | (4/m,.,.) | (0,0,0) | (0,0,frac{1}{2}) | |||||
| 4 | (b) | (bar{4},2,m) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | |||||
| 4 | (a) | (4,2,2) | (0,0,frac{1}{4}) | (0,0,frac{3}{4}) | |||||
| 426 | 141 | (I 4_1/a 2/m 2/d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 32 | (i) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{3}{4}) | (x,bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (y+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | (bar{y},bar{x},bar{z}) | ||||||
| (bar{x},bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (x+frac{1}{2},y,bar{z}+frac{3}{4}) | (y,bar{x},bar{z}) | (bar{y}+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{x},y,z) | (bar{y}+frac{1}{2},bar{x},z+frac{3}{4}) | (y,x+frac{1}{2},z+frac{1}{4}) | ||||||
| 16 | (h) | (,.m,.) | (0,y,z) | (frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},0,z+frac{3}{4}) | |||
| (frac{1}{2},y,bar{z}+frac{3}{4}) | (0,bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (y+frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | (bar{y},0,bar{z}) | ||||||
| 16 | (g) | (,.,.,2) | (x,x,0) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{1}{2}) | (bar{x},x+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},bar{x},frac{3}{4}) | |||
| (bar{x},bar{x}+frac{1}{2},frac{1}{4}) | (x+frac{1}{2},x,frac{3}{4}) | (x,bar{x},0) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{2}) | ||||||
| 16 | (f) | (,.,2,.) | (x,frac{1}{4},frac{1}{8}) | (bar{x}+frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{3}{4},x+frac{1}{2},frac{3}{8}) | (frac{3}{4},bar{x},frac{7}{8}) | |||
| (bar{x},frac{1}{4},frac{1}{8}) | (x+frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{1}{4},bar{x},frac{7}{8}) | (frac{1}{4},x+frac{1}{2},frac{3}{8}) | ||||||
| 8 | (e) | (2,mm,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | (frac{1}{2},0,bar{z}+frac{3}{4}) | (frac{1}{2},frac{1}{2},bar{z}+frac{1}{2}) | |||
| 8 | (d) | (,.,2/m,.) | (0,frac{1}{4},frac{5}{8}) | (frac{1}{2},frac{1}{4},frac{1}{8}) | (frac{3}{4},frac{1}{2},frac{7}{8}) | (frac{3}{4},0,frac{3}{8}) | |||
| 8 | (c) | (,.,2/m,.) | (0,frac{1}{4},frac{1}{8}) | (frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{3}{4},frac{1}{2},frac{3}{8}) | (frac{3}{4},0,frac{7}{8}) | |||
| 4 | (b) | (bar{4},m,2) | (0,0,frac{1}{2}) | (0,frac{1}{2},frac{3}{4}) | |||||
| 4 | (a) | (bar{4},m,2) | (0,0,0) | (0,frac{1}{2},frac{1}{4}) | |||||
| 427 | 141 | (I 4_1/a 2/m 2/d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 32 | (i) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y},z+frac{1}{2}) | (bar{y}+frac{1}{4},x+frac{3}{4},z+frac{1}{4}) | (y+frac{1}{4},bar{x}+frac{1}{4},z+frac{3}{4}) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{1}{2}) | (x,bar{y},bar{z}) | (y+frac{1}{4},x+frac{3}{4},bar{z}+frac{1}{4}) | (bar{y}+frac{1}{4},bar{x}+frac{1}{4},bar{z}+frac{3}{4}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y,bar{z}+frac{1}{2}) | (y+frac{3}{4},bar{x}+frac{1}{4},bar{z}+frac{3}{4}) | (bar{y}+frac{3}{4},x+frac{3}{4},bar{z}+frac{1}{4}) | ||||||
| (x+frac{1}{2},bar{y},z+frac{1}{2}) | (bar{x},y,z) | (bar{y}+frac{3}{4},bar{x}+frac{1}{4},z+frac{3}{4}) | (y+frac{3}{4},x+frac{3}{4},z+frac{1}{4}) | ||||||
| 16 | (h) | (,.m,.) | (0,y,z) | (frac{1}{2},bar{y},z+frac{1}{2}) | (bar{y}+frac{1}{4},frac{3}{4},z+frac{1}{4}) | (y+frac{1}{4},frac{1}{4},z+frac{3}{4}) | |||
| (frac{1}{2},y,bar{z}+frac{1}{2}) | (0,bar{y},bar{z}) | (y+frac{1}{4},frac{3}{4},bar{z}+frac{1}{4}) | (bar{y}+frac{1}{4},frac{1}{4},bar{z}+frac{3}{4}) | ||||||
| 16 | (g) | (,.,.,2) | (x,x+frac{1}{4},frac{7}{8}) | (bar{x}+frac{1}{2},bar{x}+frac{3}{4},frac{3}{8}) | (bar{x},x+frac{3}{4},frac{1}{8}) | (x+frac{1}{2},bar{x}+frac{1}{4},frac{5}{8}) | |||
| (bar{x},bar{x}+frac{3}{4},frac{1}{8}) | (x+frac{1}{2},x+frac{1}{4},frac{5}{8}) | (x,bar{x}+frac{1}{4},frac{7}{8}) | (bar{x}+frac{1}{2},x+frac{3}{4},frac{3}{8}) | ||||||
| 16 | (f) | (,.,2,.) | (x,0,0) | (bar{x}+frac{1}{2},0,frac{1}{2}) | (frac{1}{4},x+frac{3}{4},frac{1}{4}) | (frac{1}{4},bar{x}+frac{1}{4},frac{3}{4}) | |||
| (bar{x},0,0) | (x+frac{1}{2},0,frac{1}{2}) | (frac{3}{4},bar{x}+frac{1}{4},frac{3}{4}) | (frac{3}{4},x+frac{3}{4},frac{1}{4}) | ||||||
| 8 | (e) | (2,mm,.) | (0,frac{1}{4},z) | (0,frac{3}{4},z+frac{1}{4}) | (frac{1}{2},frac{1}{4},bar{z}+frac{1}{2}) | (frac{1}{2},frac{3}{4},bar{z}+frac{1}{4}) | |||
| 8 | (d) | (,.,2/m,.) | (0,0,frac{1}{2}) | (frac{1}{2},0,0) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | |||
| 8 | (c) | (,.,2/m,.) | (0,0,0) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | |||
| 4 | (b) | (bar{4},m,2) | (0,frac{1}{4},frac{3}{8}) | (0,frac{3}{4},frac{5}{8}) | |||||
| 4 | (a) | (bar{4},m,2) | (0,frac{3}{4},frac{1}{8}) | (frac{1}{2},frac{3}{4},frac{3}{8}) | |||||
| 428 | 142 | (I 4_1/a 2/c 2/d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 32 | (g) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y}+frac{1}{2},z+frac{1}{2}) | (bar{y},x+frac{1}{2},z+frac{1}{4}) | (y+frac{1}{2},bar{x},z+frac{3}{4}) | |||
| (bar{x}+frac{1}{2},y,bar{z}+frac{1}{4}) | (x,bar{y}+frac{1}{2},bar{z}+frac{3}{4}) | (y+frac{1}{2},x+frac{1}{2},bar{z}) | (bar{y},bar{x},bar{z}+frac{1}{2}) | ||||||
| (bar{x},bar{y}+frac{1}{2},bar{z}+frac{1}{4}) | (x+frac{1}{2},y,bar{z}+frac{3}{4}) | (y,bar{x},bar{z}) | (bar{y}+frac{1}{2},x+frac{1}{2},bar{z}+frac{1}{2}) | ||||||
| (x+frac{1}{2},bar{y}+frac{1}{2},z) | (bar{x},y,z+frac{1}{2}) | (bar{y}+frac{1}{2},bar{x},z+frac{1}{4}) | (y,x+frac{1}{2},z+frac{3}{4}) | ||||||
| 16 | (f) | (,.,.,2) | (x,x,frac{1}{4}) | (bar{x}+frac{1}{2},bar{x}+frac{1}{2},frac{3}{4}) | (bar{x},x+frac{1}{2},frac{1}{2}) | (x+frac{1}{2},bar{x},0) | |||
| (bar{x},bar{x}+frac{1}{2},0) | (x+frac{1}{2},x,frac{1}{2}) | (x,bar{x},frac{3}{4}) | (bar{x}+frac{1}{2},x+frac{1}{2},frac{1}{4}) | ||||||
| 16 | (e) | (,.,2,.) | (frac{1}{4},y,frac{1}{8}) | (frac{1}{4},bar{y}+frac{1}{2},frac{5}{8}) | (bar{y},frac{3}{4},frac{3}{8}) | (y+frac{1}{2},frac{3}{4},frac{7}{8}) | |||
| (frac{3}{4},bar{y}+frac{1}{2},frac{1}{8}) | (frac{3}{4},y,frac{5}{8}) | (y,frac{3}{4},frac{7}{8}) | (bar{y}+frac{1}{2},frac{3}{4},frac{3}{8}) | ||||||
| 16 | (d) | (2,.,.) | (0,0,z) | (0,frac{1}{2},z+frac{1}{4}) | (frac{1}{2},0,bar{z}+frac{1}{4}) | (frac{1}{2},frac{1}{2},bar{z}) | |||
| (0,frac{1}{2},bar{z}+frac{1}{4}) | (0,0,bar{z}) | (frac{1}{2},frac{1}{2},z) | (frac{1}{2},0,z+frac{1}{4}) | ||||||
| 16 | (c) | (bar{1}) | (0,frac{1}{4},frac{1}{8}) | (frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{3}{4},frac{1}{2},frac{3}{8}) | (frac{3}{4},0,frac{7}{8}) | |||
| (frac{1}{2},frac{1}{4},frac{1}{8}) | (0,frac{1}{4},frac{5}{8}) | (frac{3}{4},frac{1}{2},frac{7}{8}) | (frac{3}{4},0,frac{3}{8}) | ||||||
| 8 | (b) | (2,.,22) | (0,0,frac{1}{4}) | (0,frac{1}{2},frac{1}{2}) | (0,frac{1}{2},0) | (0,0,frac{3}{4}) | |||
| 8 | (a) | (bar{4},.,.) | (0,0,0) | (0,frac{1}{2},frac{1}{4}) | (frac{1}{2},0,frac{1}{4}) | (frac{1}{2},frac{1}{2},0) | |||
| 429 | 142 | (I 4_1/a 2/c 2/d) | ((0,0,0)+) | ( (frac{1}{2},frac{1}{2},frac{1}{2})+ ) | |||||
| 32 | (g) | (1) | (x,y,z) | (bar{x}+frac{1}{2},bar{y},z+frac{1}{2}) | (bar{y}+frac{1}{4},x+frac{3}{4},z+frac{1}{4}) | (y+frac{1}{4},bar{x}+frac{1}{4},z+frac{3}{4}) | |||
| (bar{x}+frac{1}{2},y,bar{z}) | (x,bar{y},bar{z}+frac{1}{2}) | (y+frac{1}{4},x+frac{3}{4},bar{z}+frac{3}{4}) | (bar{y}+frac{1}{4},bar{x}+frac{1}{4},bar{z}+frac{1}{4}) | ||||||
| (bar{x},bar{y},bar{z}) | (x+frac{1}{2},y,bar{z}+frac{1}{2}) | (y+frac{3}{4},bar{x}+frac{1}{4},bar{z}+frac{3}{4}) | (bar{y}+frac{3}{4},x+frac{3}{4},bar{z}+frac{1}{4}) | ||||||
| (x+frac{1}{2},bar{y},z) | (bar{x},y,z+frac{1}{2}) | (bar{y}+frac{3}{4},bar{x}+frac{1}{4},z+frac{1}{4}) | (y+frac{3}{4},x+frac{3}{4},z+frac{3}{4}) | ||||||
| 16 | (f) | (,.,.,2) | (x,x+frac{1}{4},frac{1}{8}) | (bar{x}+frac{1}{2},bar{x}+frac{3}{4},frac{5}{8}) | (bar{x},x+frac{3}{4},frac{3}{8}) | (x+frac{1}{2},bar{x}+frac{1}{4},frac{7}{8}) | |||
| (bar{x},bar{x}+frac{3}{4},frac{7}{8}) | (x+frac{1}{2},x+frac{1}{4},frac{3}{8}) | (x,bar{x}+frac{1}{4},frac{5}{8}) | (bar{x}+frac{1}{2},x+frac{3}{4},frac{1}{8}) | ||||||
| 16 | (e) | (,.,2,.) | (x,0,frac{1}{4}) | (bar{x}+frac{1}{2},0,frac{3}{4}) | (frac{1}{4},x+frac{3}{4},frac{1}{2}) | (frac{1}{4},bar{x}+frac{1}{4},0) | |||
| (bar{x},0,frac{3}{4}) | (x+frac{1}{2},0,frac{1}{4}) | (frac{3}{4},bar{x}+frac{1}{4},frac{1}{2}) | (frac{3}{4},x+frac{3}{4},0) | ||||||
| 16 | (d) | (2,.,.) | (0,frac{1}{4},z) | (0,frac{3}{4},z+frac{1}{4}) | (frac{1}{2},frac{1}{4},bar{z}) | (frac{1}{2},frac{3}{4},bar{z}+frac{3}{4}) | |||
| (0,frac{3}{4},bar{z}) | (0,frac{1}{4},bar{z}+frac{3}{4}) | (frac{1}{2},frac{3}{4},z) | (frac{1}{2},frac{1}{4},z+frac{1}{4}) | ||||||
| 16 | (c) | (bar{1}) | (0,0,0) | (frac{1}{2},0,frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{1}{4}) | (frac{1}{4},frac{1}{4},frac{3}{4}) | |||
| (frac{1}{2},0,0) | (0,0,frac{1}{2}) | (frac{1}{4},frac{3}{4},frac{3}{4}) | (frac{1}{4},frac{1}{4},frac{1}{4}) | ||||||
| 8 | (b) | (2,.,22) | (0,frac{1}{4},frac{1}{8}) | (0,frac{3}{4},frac{3}{8}) | (0,frac{3}{4},frac{7}{8}) | (0,frac{1}{4},frac{5}{8}) | |||
| 8 | (a) | (bar{4},.,.) | (0,frac{1}{4},frac{3}{8}) | (0,frac{3}{4},frac{5}{8}) | (frac{1}{2},frac{1}{4},frac{5}{8}) | (frac{1}{2},frac{3}{4},frac{3}{8}) | |||