diffractionとは、crystalに対して特定の条件(Bragg condition)で波を入射したとき散乱波が強め合う現象のことです。where、Bragg conditionを満たしたからと言って、必ずdiffractionが起きるわけではありません。crystalが複合格子並進、らせん、映進などのsymmetry operationを有している場合は、たとえBragg conditionを満たしても、特定のMiller indicesのdiffraction波の強度は消滅1します。このページでは、diffractionが観測されたcrystalMiller indicesのリストからspace groupを絞り込むための方法を提供します。
belowに示す表は、diffractionによって出現するMiller indicesとspace groupの関係一覧を示します。消滅するMiller indicesでないことにご注意ください。
- reflection conditions(Reflection conditions)はMiller indicesのタイプによって分類されており、たとえば上段に (h0l) とある場合は 「(h) と (l) は任意だが (k) が (0) であるcrystal面」が条件の対象となります。 (hkl) と書かれていたらすべてのcrystal面が対象となりますし、(hhl) と書かれていたら(h=k) であるようなcrystal面が対象です。
- 条件中の (h, k, l, h+k) などはその値が偶数のときに出現することを意味しています。(h,l) などカンマで区切られている場合は「 (h) と (l) がともに偶数」が出現条件であることを意味します。偶数以外の出現条件は (=3n,,, =4n,,, =6n) などと明記されています。空欄の場合は、そのMiller indicesタイプに対して出現規則がないことを意味します。
- space groupの表記は、標準表記でないものもありますのでご注意ください。space group表記に続くカッコ内の数値はInternational Tables for Crystallography, Vol A. に記載されているspace group番号を示しています。
Triclinic triclinic crystal system
| Reflection conditions | Extinction symbol |
Point group | |
|---|---|---|---|
| (1) | (bar{1}) | ||
| None | (P – ) | (P1, _{(1)}) | (Pbar{1}, _{(2)}) |
Monoclinic monoclinic crystal system
Unique axis b
| Reflection conditions | Extinction symbol |
Laue class (1 2/m 1) | ||||
|---|---|---|---|---|---|---|
| Point group | ||||||
| (hkl, 0kl, hk0) | (h0l, h00, 00l) | (0k0) | (2) | (m) | (2/m) | |
| (P1 – 1) | (P121, _{(3)}) | (P1m1, _{(6)}) | (P1 2/m 1, _{(10)}) | |||
| (k) | (P12_11) | (P12_11, _{(4)}) | (P1 2_1/m 1, _{(11)}) | |||
| (h) | (P1a1) | (P1a1, _{(7)}) | (P1 2/a 1, _{(13)}) | |||
| (h) | (k) | (P1 2_1/a 1) | (P1 2_1/a 1, _{(14)}) | |||
| (l) | (P1c1) | (P1c1, _{(7)}) | (P1 2/c 1, _{(13)}) | |||
| (l) | (k) | (P1 2_1/c 1) | (P1 2_1/c 1, _{(14)}) | |||
| (h + l) | (P1n1) | (P1n1, _{(7)}) | (P1 2/n 1, _{(13)}) | |||
| (h + l) | (k) | (P1 2_1/n 1) | (P1 2_1/n 1, _{(14)}) | |||
| (h + k) | (h) | (k) | (C1 – 1) | (C121, _{(5)}) | (C1m1, _{(8)}) | (C1 2/m 1, _{(12)}) |
| (h + k) | (h, l) | (k) | (C1c1) | (C1c1, _{(9)}) | (C1 2/c 1, _{(15)}) | |
| (h + l) | (l) | (k) | (A1 – 1) | (A121, _{(5)}) | (A1m1, _{(8)}) | (A1 2/m 1, _{(12)}) |
| (h + l) | (h, l) | (k) | (A1n1) | (A1n1, _{(9)}) | (A1 2/n 1, _{(15)}) | |
| (h + k + l) | (h + l) | (k) | (I1 – 1) | (I121, _{(5)}) | (I1m1, _{(8)}) | (I1 2/m 1, _{(12)}) |
| (h + k + l) | (h, l) | (k) | (I1a1) | (I1a1, _{(9)}) | (I1 2/a 1, _{(15)}) | |
Unique axis c
| Reflection conditions | Extinction symbol |
Laue class (1 1 2/m) | ||||
|---|---|---|---|---|---|---|
| Point group | ||||||
| (hkl, 0kl, h0l) | (hk0, h00, 0k0) | (00l) | (2) | (m) | (2/m) | |
| (P11 – ) | (P112, _{(3)}) | (P11 m, _{(6)}) | (P11 2/m, _{(10)}) | |||
| (l) | (P12_11) | (P112_1, _{(4)}) | (P112_1/m, _{(11)}) | |||
| (h) | (P11a) | (P11a, _{(7)}) | (P11 2/a, _{(13)}) | |||
| (h) | (l) | (P11 2_1/a) | (P11 2_1/a, _{(14)}) | |||
| (k) | (P11b) | (P11b, _{(7)}) | (P11 2/b, _{(13)}) | |||
| (k) | (l) | (P11 2_1/b) | (P11 2_1/b, _{(14)}) | |||
| (h + k) | (P11n) | (P11n, _{(7)}) | (P11 2/n, _{(13)}) | |||
| (h + k) | (l) | (P11 2_1/n) | (P1 1 2_1/n, _{(14)}) | |||
| (h + l) | (h) | (l) | (B11 – ) | (C112, _{(5)}) | (C11m, _{(8)}) | (C11 2/m, _{(12)}) |
| (h + l) | (h, k) | (l) | (B11n) | (C11c, _{(9)}) | (C11 2/c, _{(15)}) | |
| (k + l) | (k) | (l) | (A11 – ) | (A112, _{(5)}) | (A11m, _{(8)}) | (A11 2/m, _{(12)}) |
| (k + l) | (h, k) | (l) | (A11a) | (A11n, _{(9)}) | (A11 2/n, _{(15)}) | |
| (h + k + l) | (h + k) | (l) | (I11 – ) | (I112, _{(5)}) | (I11m, _{(8)}) | (I11 2/m, _{(12)}) |
| (h + k + l) | (h, k) | (l) | (I11b) | (I11b, _{(9)}) | (I11 2/b, _{(15)}) | |
Unique axis a
| Reflection conditions | Extinction symbol |
Laue class (2/m 1 1) | ||||
|---|---|---|---|---|---|---|
| Point group | ||||||
| (hkl, h0l, hk0) | (0kl, 0k0, 00l) | (h00) | (2) | (m) | (2/m) | |
| (P – 11) | (P211, _{(3)}) | (Pm11, _{(6)}) | (P2/m 11, _{(10)}) | |||
| (h) | (P2_111) | (P2_111, _{(4)}) | (P2_1/m 11, _{(11)}) | |||
| (k) | (Pb11) | (P a 11, _{(7)}) | (P2/b 11, _{(13)}) | |||
| (k) | (h) | (P2_1/b 11) | (P2_1/b 11, _{(14)}) | |||
| (l) | (Pc11) | (Pc11, _{(7)}) | (P2/c 11, _{(13)}) | |||
| (l) | (h) | (P2_1/c 11) | (P2_1/c 11, _{(14)}) | |||
| (k + l) | (Pn11) | (Pn11, _{(7)}) | (P2/n 11, _{(13)}) | |||
| (k + l) | (h) | (P2_1/n 11) | (P2_1/n 11, _{(14)}) | |||
| (h + k) | (k) | (h) | (C – 11) | (C211, _{(5)}) | (Cm11, _{(8)}) | (C2/m 11, _{(12)}) |
| (h + k) | (k, l) | (h) | (Cn11) | (Cn11, _{(9)}) | (C2/n 11, _{(15)}) | |
| (h + l) | (l) | (h) | (B – 11) | (B211, _{(5)}) | (Bm11, _{(8)}) | (B2/m 11, _{(12)}) |
| (h + l) | (k, l) | (h) | (Bb11) | (Bb11, _{(9)}) | (B2/b 11, _{(15)}) | |
| (h + k + l) | (k + l) | (h) | (I – 11) | (I211, _{(5)}) | (Im11, _{(8)}) | (I2/m 11, _{(12)}) |
| (h + k + l) | (k, l) | (h) | (Ic11) | (Ic11, _{(9)}) | (I2/c 11, _{(15)}) | |
Orthorhombic 直方晶系
| Reflection conditions | Extinction symbol |
Laue class (mmm (2/m, 2/m, 2/m)) | ||||||||
|---|---|---|---|---|---|---|---|---|---|---|
| Point group | ||||||||||
| (hkl) | (0kl) | (h0l) | (hk0) | (h00) | (0k0) | (00l) | (222) | (mm2), (m2m), (2mm) |
(mmm) | |
| (P – – – ) | (P222, _{(16)}) | (Pmm2, _{(25)}) (Pm2m, _{(25)}) (P2mm, _{(25)}) |
(Pmmm, _{(47)}) | |||||||
| (l) | (P – – 2_1) | (P222_1, _{(17)}) | ||||||||
| (k) | (P – 2_1 – ) | (P22_12, _{(17)}) | ||||||||
| (k) | (l) | (P – 2_12_1) | (P22_12_1, _{(18)}) | |||||||
| (h) | (P2_1 – – ) | (P2_122, _{(17)}) | ||||||||
| (h) | (l) | (P2_1 – 2_1) | (P2_122_1, _{(18)}) | |||||||
| (h) | (k) | (P2_12_1 – ) | (P2_12_12, _{(18)}) | |||||||
| (h) | (k) | (l) | (P2_12_12_1) | (P2_12_12_1, _{(19)}) | ||||||
| (h) | (h) | (P – – a) | (Pm2a, _{(28)}) ( P2_1ma, _{(26)}) |
(Pmma, _{(51)}) | ||||||
| (k) | (k) | (P – – b) | (Pm2_1b, _{(26)}) ( P2_1mb, _{(28)}) |
(Pmmb, _{(51)}) | ||||||
| (h + k) | (h) | (k) | (P – – n) | (Pm2_1n, _{(31)}) ( P2_1mn, _{(31)}) |
(Pmmn, _{(59)}) | |||||
| (h) | (h) | (P – a – ) | (Pma2, _{(28)}) ( P2_1am, _{(26)}) |
(Pmam, _{(51)}) | ||||||
| (h) | (h) | (h) | (P – aa) | (P2aa, _{(27)}) | (Pmaa, _{(49)}) | |||||
| (h) | (k) | (h) | (k) | (P – ab) | (P2_1ab, _{(29)}) | (Pmab, _{(57)}) | ||||
| (h) | (h + k) | (h) | (k) | (P – an) | (P2_1an, _{(30)}) | (Pman, _{(53)}) | ||||
| (l) | (l) | (P – c – ) | (Pmc2_1, _{(26)}) ( P2cm, _{(28)}) |
(Pmcm, _{(51)}) | ||||||
| (l) | (h) | (h) | (l) | (P – ca) | (P2_1ca, _{(29)}) | (Pmca, _{(57)}) | ||||
| (l) | (k) | (k) | (l) | (P – cb) | (P2cb, _{(32)}) | (Pmcb, _{(55)}) | ||||
| (l) | (h + k) | (h) | (k) | (l) | (P – cn) | (P2_1cn, _{(33)}) | (Pmcn, _{(62)}) | |||
| (h + l) | (h) | (l) | (P – n – ) | (Pmn2_1, _{(31)}) ( P2_1nm, _{(31)}) |
(Pmnm, _{(59)}) | |||||
| (h + l) | (h) | (h) | (l) | (P – na) | (P2na, _{(30)}) | (Pmna, _{(53)}) | ||||
| (h + l) | (k) | (h) | (k) | (l) | (P – nb) | (P2_1nb, _{(33)}) | (Pmnb, _{(62)}) | |||
| (h + l) | (h + k) | (h) | (k) | (l) | (P – nn) | (P2nn, _{(34)}) | (Pmnn, _{(58)}) | |||
| (k) | (k) | (Pb – – ) | (Pbm2, _{(28)}) ( Pb2_1m, _{(26)}) |
(Pbmm, _{(51)}) | ||||||
| (k) | (h) | (h) | (k) | (Pb – a) | (Pb2_1a, _{(29)}) | (Pbma, _{(57)}) | ||||
| (k) | (k) | (k) | (Pb – b) | (Pb2b, _{(27)}) | (Pbmb, _{(49)}) | |||||
| (k) | (h + k) | (h) | (k) | (Pb – n) | (Pb2n, _{(30)}) | (Pbmn, _{(53)}) | ||||
| (k) | (h) | (h) | (k) | (Pba – ) | (Pba2, _{(32)}) | (Pbam, _{(55)}) | ||||
| (k) | (h) | (h) | (h) | (k) | (Pbaa) | (Pbaa, _{(54)}) | ||||
| (k) | (h) | (k) | (h) | (k) | (Pbab) | (Pbab, _{(54)}) | ||||
| (k) | (h) | (h + k) | (h) | (k) | (Pban) | (Pban, _{(50)}) | ||||
| (k) | (l) | (k) | (l) | (Pbc – ) | (Pbc2_1, _{(29)}) | (Pbcm, _{(57)}) | ||||
| (k) | (l) | (h) | (h) | (k) | (l) | (Pbca) | (Pbca, _{(61)}) | |||
| (k) | (l) | (k) | (k) | (l) | (Pbcb) | (Pbcb, _{(54)}) | ||||
| (k) | (l) | (h + k) | (h) | (k) | (l) | (Pbcn) | (Pbcn, _{(60)}) | |||
| (k) | (h + l) | (h) | (k) | (l) | (Pbn – ) | (Pbn2_1, _{(33)}) | (Pbnm, _{(62)}) | |||
| (k) | (h + l) | (h) | (h) | (k) | (l) | (Pbna) | (Pbna, _{(60)}) | |||
| (k) | (h + l) | (k) | (h) | (k) | (l) | (Pbnb) | (Pbnb, _{(56)}) | |||
| (k) | (h + l) | (h + k) | (h) | (k) | (l) | (Pbnn) | (Pbnn, _{(52)}) | |||
| (l) | (l) | (Pc – – ) | (Pcm2_1, _{(26)}) ( Pc2m, _{(28)}) |
(Pcmm, _{(51)}) | ||||||
| (l) | (h) | (h) | (l) | (Pc – a) | (Pc2a, _{(32)}) | (Pcma, _{(55)}) | ||||
| (l) | (k) | (k) | (l) | (Pc – b) | (Pc2_1b, _{(29)}) | (Pcmb, _{(57)}) | ||||
| (l) | (h + k) | (h) | (k) | (l) | (Pc – n) | (Pc2_1n, _{(33)}) | (Pcmn, _{(62)}) | |||
| (l) | (h) | (h) | (l) | (Pca – ) | (Pca2_1, _{(29)}) | (Pcam, _{(57)}) | ||||
| (l) | (h) | (h) | (h) | (l) | (Pcaa) | (Pcaa, _{(54)}) | ||||
| (l) | (h) | (k) | (h) | (k) | (l) | (Pcab) | (Pcab, _{(61)}) | |||
| (l) | (h) | (h + k) | (h) | (k) | (l) | (Pcan) | (Pcan, _{(60)}) | |||
| (l) | (l) | (l) | (Pcc – ) | (Pcc2, _{(27)}) | (Pccm, _{(49)}) | |||||
| (l) | (l) | (h) | (h) | (l) | (Pcca) | (Pcca, _{(54)}) | ||||
| (l) | (l) | (k) | (k) | (l) | (Pccb) | (Pccb, _{(54)}) | ||||
| (l) | (l) | (h + k) | (h) | (k) | (l) | (Pccn) | (Pccn, _{(56)}) | |||
| (l) | (h + l) | (h) | (l) | (Pcn – ) | (Pcn2, _{(30)}) | (Pcnm, _{(53)}) | ||||
| (l) | (h + l) | (h) | (h) | (l) | (Pcna) | (Pcna, _{(50)}) | ||||
| (l) | (h + l) | (k) | (h) | (k) | (l) | (Pcnb) | (Pcnb, _{(60)}) | |||
| (l) | (h + l) | (h + k) | (h) | (k) | (l) | (Pcnn) | (Pcnn, _{(52)}) | |||
| (k + l) | (k) | (l) | (Pn – – ) | (Pnm2_1, _{(31)}) ( Pn2_1m, _{(31)}) |
(Pnmm, _{(59)}) | |||||
| (k + l) | (h) | (h) | (k) | (l) | (Pn – a) | (Pn2_1a, _{(33)}) | (Pnma, _{(62)}) | |||
| (k + l) | (k) | (k) | (l) | (Pn – b) | (Pn2b, _{(30)}) | (Pnmb, _{(53)}) | ||||
| (k + l) | (h + k) | (h) | (k) | (l) | (Pn – n) | (Pn2n, _{(34)}) | (Pnmn, _{(58)}) | |||
| (k + l) | (h) | (h) | (k) | (l) | (Pna – ) | (Pna2_1, _{(33)}) | (Pnam, _{(62)}) | |||
| (k + l) | (h) | (h) | (h) | (k) | (l) | (Pnaa) | (Pnaa, _{(56)}) | |||
| (k + l) | (h) | (k) | (h) | (k) | (l) | (Pnab) | (Pnab, _{(60)}) | |||
| (k + l) | (h) | (h + k) | (h) | (k) | (l) | (Pnan) | (Pnan, _{(52)}) | |||
| (k + l) | (l) | (k) | (l) | (Pnc – ) | (Pnc2, _{(30)}) | (Pncm, _{(53)}) | ||||
| (k + l) | (l) | (h) | (h) | (k) | (l) | (Pnca) | (Pnca, _{(60)}) | |||
| (k + l) | (l) | (k) | (k) | (l) | (Pncb) | (Pncb, _{(50)}) | ||||
| (k + l) | (l) | (h + k) | (h) | (k) | (l) | (Pncn) | (Pncn, _{(52)}) | |||
| (k + l) | (h + l) | (h) | (k) | (l) | (Pnn – ) | (Pnn2, _{(34)}) | (Pnnm, _{(58)}) | |||
| (k + l) | (h + l) | (h) | (h) | (k) | (l) | (Pnna) | (Pnna, _{(52)}) | |||
| (k + l) | (h + l) | (k) | (h) | (k) | (l) | (Pnnb) | (Pnnb, _{(52)}) | |||
| (k + l) | (h + l) | (h + k) | (h) | (k) | (l) | (Pnnn) | (Pnnn, _{(48)}) | |||
| (h + k) | (k) | (h) | (h + k) | (h) | (k) | (C – – – ) | (C222, _{(21)}) | (Cmm2, _{(35)}) ( Cm2m, _{(38)}) ( C2mm, _{(38)}) |
(Cmmm, _{(65)}) | |
| (h + k) | (k) | (h) | (h + k) | (h) | (k) | (l) | (C – – 2_1) | (C222_1, _{(20)}) | ||
| (h + k) | (k) | (h) | (h, k) | (h) | (k) | (C – – (ab)) | (Cm2e, _{(39)}) ( C2me, _{(39)}) |
(Cmme, _{(67)}) | ||
| (h + k) | (k) | (h, l) | (h + k) | (h) | (k) | (l) | (C – c – ) | (Cmc2_1, _{(36)}) ( C2cm, _{(40)}) |
(Cmcm, _{(63)}) | |
| (h + k) | (k) | (h, l) | (h, k) | (h) | (k) | (l) | (C – c(ab)) | (C2ce, _{(41)}) | (Cmce, _{(64)}) | |
| (h + k) | (k. l) | (h) | (h + k) | (h) | (k) | (l) | (Cc – – ) | (Ccm2_1, _{(36)}) ( Cc2m, _{(40)}) |
(Ccmm, _{(63)}) | |
| (h + k) | (k, l) | (h) | (h, k) | (h) | (k) | (l) | (Cc – (ab)) | (Cc2e, _{(41)}) | (Ccme, _{(64)}) | |
| (h + k) | (k. l) | (h, l) | (h + k) | (h) | (k) | (l) | (Ccc – ) | (Ccc2, _{(37)}) | (Cccm, _{(66)}) | |
| (h + k) | (k. l) | (h, l) | (h, k) | (h) | (k) | (l) | (Ccc(ab)) | (Ccce, _{(68)}) | ||
| (h + l) | (l) | (h + l) | (h) | (h) | (l) | (B – – – ) | (B222, _{(21)}) | (Bmm2, _{(38)}) (Bm2m, _{(35)}) (B2mm, _{(38)}) |
(Bmmm, _{(65)}) | |
| (h + l) | (l) | (h + l) | (h) | (h) | (k) | (l) | (B – 2_1 – ) | (B22_12, _{(20)}) | ||
| (h + l) | (l) | (h + l) | (h, k) | (h) | (k) | (l) | (B – – b) | (Bm2_1b, _{(36)}) (B2mb, _{(40)}) |
(Bmmb, _{(63)}) | |
| (h + l) | (l) | (h, l) | (h) | (h) | (l) | (B – (ac) – ) | (Bme2, _{(39)}) (B2em, _{(39)}) |
(Bmem, _{(67)}) | ||
| (h + l) | (l) | (h, l) | (h, k) | (h) | (k) | (l) | (B – (ac)b) | (B2eb, _{(41)}) | (Bmeb, _{(64)}) | |
| (h + l) | (k. l) | (h + l) | (h) | (h) | (k) | (l) | (Bb – – ) | (Bbm2, _{(40)}) ( Bb2_1m, _{(36)}) |
(Bbmm, _{(63)}) | |
| (h + l) | (k. l) | (h + l) | (h, k) | (h) | (k) | (l) | (Bb – b) | (Bb2b, _{(37)}) | (Bbmb, _{(66)}) | |
| (h + l) | (k, l) | (h. l) | (h) | (h) | (k) | (l) | (Bb(ac) – ) | (Bbe2, _{(41)}) | (Bbem, _{(64)}) | |
| (h + l) | (k. l) | (h, l) | (h, k) | (h) | (k) | (l) | (Bb(ac)b) | (Bbeb, _{(68)}) | ||
| (k + l) | (k + l) | (l) | (k) | (k) | (l) | (A – – – ) | (A222, _{(21)}) | (Amm2, _{(38)}) (Am2m, _{(38)}) (A2mm, _{(35)}) |
(Ammm, _{(65)}) | |
| (k + l) | (k + l) | (l) | (k) | (h) | (k) | (l) | (A2_1 – – ) | (A2_122, _{(20)}) | ||
| (k + l) | (k + l) | (l) | (h, k) | (h) | (k) | (l) | (A – – a) | (Am2a, _{(40)}) (A2_1ma, _{(36)}) |
(Amma, _{(63)}) | |
| (k + l) | (k + l) | (h, l) | (k) | (h) | (k) | (l) | (A – a – ) | (Ama2, _{(40)}) (A2_1am, _{(36)}) |
(Amam, _{(63)}) | |
| (k + l) | (k + l) | (h, l) | (h, k) | (h) | (k) | (l) | (A – aa) | (A2aa, _{(37)}) | (Amaa, _{(66)}) | |
| (k + l) | (k. l) | (l) | (k) | (k) | (l) | (A(bc) – – ) | (Aem2, _{(39)}) (Ae2m, _{(39)}) |
(Aemm, _{(67)}) | ||
| (k + l) | (k. l) | (l) | (h, k) | (h) | (k) | (l) | (A(bc) – a) | (Ae2a, _{(41)}) | (Aema, _{(64)}) | |
| (k + l) | (k. l) | (h, l) | (k) | (h) | (k) | (l) | (A(bc)a – ) | (Aea2, _{(41)}) | (Aeam, _{(64)}) | |
| (k + l) | (k, l) | (h, l) | (h, k) | (h) | (k) | (l) | (A(bc)aa) | (Aeaa, _{(68)}) | ||
| (h + k + l) | (k + l) | (h + l) | (h + k) | (h) | (k) | (l) | (I – – – ) | (I222, _{(23)}) ( I2_12_12_1, _{(24)}) |
(Imm2, _{(44)}) ( Im2m, _{(44)}) ( I2mm, _{(44)}) |
(Immm, _{(71)}) |
| (h + k + l) | (k + l) | (h + l) | (h, k) | (h) | (k) | (l) | (I – – (ab)) | (Im2a, _{(46)}) ( I2mb, _{(46)}) |
(Imma, _{(74)}) ( Immb, _{(74)}) |
|
| (h + k + l) | (k + l) | (h, l) | (h + k) | (h) | (k) | (l) | (I – (ac) – ) | (Ima2, _{(46)}) ( I2cm, _{(46)}) |
(Imam, _{(74)}) ( Imcm, _{(74)}) |
|
| (h + k + l) | (k + l) | (h, l) | (h, k) | (h) | (k) | (l) | (I – cb) | (I2cb, _{(45)}) | (Imcb, _{(72)}) | |
| (h + k + l) | (k, l) | (h + l) | (h + k) | (h) | (k) | (l) | (I(bc) – – ) | (Iem2, _{(46)}) ( Ie2m, _{(46)}) |
(Iemm, _{(74)}) | |
| (h + k + l) | (k, l) | (h + l) | (h, k) | (h) | (k) | (l) | (Ic – a) | (Ic2a, _{(45)}) | (Icma, _{(72)}) | |
| (h + k + l) | (k, l) | (h, l) | (h + k) | (h) | (k) | (l) | (Iba – ) | (Iba2, _{(45)}) | (Ibam, _{(72)}) | |
| (h + k + l) | (k, l) | (h, l) | (h, k) | (h) | (k) | (l) | (Ibca) | (Ibca, _{(73)}) (Icab, _{(73)}) |
||
| (h + k, h + l, ) (k + l) |
(k, l) | (h, l) | (h, k) | (h) | (k) | (l) | (F – – – ) | (F222, _{(22)}) | (Fmm2, _{(42)}) (Fm2m, _{(42)}) ( F2mm, _{(42)}) |
(Fmmm, _{(69)}) |
| (h + k, h + l,) ( k + l) |
(k, l) | (h+l=4n;) ( h, l) |
(h+k=4n;) ( h, k) |
(h = 4n) | (k = 4n) | (l = 4n) | (F – dd) | (F2dd, _{(43)}) | ||
| (h + k, h + l, ) (k + l) |
(k+l=4n; ) (k, l) |
(h, l) | (h+k = 4n;) ( h, k) |
(h = 4n) | (k = 4n) | (l = 4n) | (Fd – d) | (Fd2d, _{(43)}) | ||
| (h + k, h + l, ) (k + l) |
(k+l=4n; ) (k, l) |
(h+l=4n;) ( h, l) |
(h, k) | (h = 4n) | (k = 4n) | (l = 4n) | (Fdd – ) | (Fdd2, _{(43)}) | ||
| (h + k, h + l, ) (k + l) |
(k+l=4n; ) (k, l) |
(h+l=4n; ) (h, l) |
(h+k=4n;) ( h, k) |
(h = 4n) | (k = 4n) | (l = 4n) | (Fddd) | (Fddd, _{(70)}) | ||
Tetragonal tetragonal crystal system
| Reflection conditions | Extinction symbol |
Laue class | ||||||||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| (4/m) | (4/mmm) | |||||||||||||
| Point group | ||||||||||||||
| (hkl) | (hk0) | (0kl) | (hhl) | (00l) | (0kl) | (hh0) | (4) | (bar{4}) | (4/m) | (422) | (4mm) | (bar{4}2m), (bar{4}m2) |
(4/mmm) | |
| (P – – – ) | (P4, _{(75)}) | (Pbar{4}, _{(81)}) | (P4/m, _{(83)}) | (P422, _{(89)}) | (P4mm, _{(99)}) | (Pbar{4}2m, _{(111)}) (Pbar{4}m2, _{(115)}) |
(P4/mnm, _{(123)}) | |||||||
| (k) | (P – 2_1 – ) | (P42_12, _{(90)}) | (Pbar{4}2_1m, _{(113)}) | |||||||||||
| (l) | (P4_2 – – ) | (P4_2, _{(77)}) | (P4_2/m, _{(84)}) | (P4_222, _{(93)}) | ||||||||||
| (l) | (k) | (P4_22_1 – ) | (P4_22_12, _{(94)}) | |||||||||||
| (l=) (4n) |
(P4_1 – – ) | (P4_1, _{(76)}) ( P4_3, _{(78)}) |
(P4_122, _{(91)}) ( P4_322, _{(95)}) |
|||||||||||
| (l=) (4n) |
(k) | (P412_1 – ) | (P4_12_12, _{(92)}) ( P4_32_12, _{(96)}) |
|||||||||||
| (l) | (l) | (P – – c) | (P4_2mc, _{(105)}) | (Pbar{4}2c, _{(112)}) | (P4_2/mmc, _{(131)}) | |||||||||
| (l) | (l) | (k) | (P – 2_1c) | (Pbar{4}2_1c, _{(114)}) | ||||||||||
| (k) | (k) | (P – b – ) | (P4bm, _{(100)}) | (Pbar{4}b2, _{(117)}) | (P4/mbm, _{(127)}) | |||||||||
| (k) | (l) | (l) | (k) | (P – be) | (P4_2bc, _{(106)}) | (P4_2/mbc, _{( 135)}) | ||||||||
| (l) | (l) | (P – c – ) | (P4_2cm, _{(101)}) | (Pbar{4}c2, _{(116)}) | (P4_2/mcm, _{( 132)}) | |||||||||
| (l) | (l) | (l) | (P – cc) | (P4cc, _{(103)}) | (P4/mcc, _{(124)}) | |||||||||
| (k+l) | (l) | (k) | (P – n – ) | (P4_2nm, _{(102)}) | (Pbar{4}n2, _{(118)}) | (P4_2/mnm, _{(136)}) | ||||||||
| (k+l) | (l) | (l) | (k) | (P – nc) | (P4nc, _{(104)}) | (P4/mnc, _{(128)}) | ||||||||
| (h+k) | (k) | (Pn – – ) | (P4/n, _{(85)}) | (P4/nmm, _{(129)}) | ||||||||||
| (h+k) | (l) | (k) | (P4_2/n) | (P4_2/n, _{(86)}) | ||||||||||
| (h+k) | (l) | (l) | (k) | (Pn – c) | (P4_2/mnc, _{(137)}) | |||||||||
| (h+k) | (k) | (k) | (Pnb – ) | (P4/nbm, _{(125)}) | ||||||||||
| (h+k) | (k) | (l) | (l) | (k) | (Pnbc) | (P4_2/nbc, _{(133)}) | ||||||||
| (h+k) | (l) | (l) | (l) | (k) | (Pnc – ) | (P4_2/ncm, _{(138)}) | ||||||||
| (h+k) | (l) | (l) | (l) | (k) | (Pncc) | (P4/ncc, _{(130)}) | ||||||||
| (h+k) | (k+l) | (l) | (k) | (Pnn – ) | (P4_2/nnm, _{(134)}) | |||||||||
| (h+k) | (k+l) | (l) | (l) | (k) | (Pnnc) | (P4/nnc, _{(126)}) | ||||||||
| (h+k+l) | (h+k) | (k+l) | (l) | (l) | (k) | (I – – – ) | (I4, _{(79)}) | (Ibar{4}, _{(82)}) | (I4/m, _{(87)}) | (I422, _{(97)}) | (I4mm, _{(107)}) | (Ibar{4}2m, _{(121)}) (Ibar{4}m2, _{(119)}) |
(I4/mmm, _{(139)}) | |
| (h+k+l) | (h+k) | (k+l) | (l) | (l=) (4n) |
(k) | (I4_1 – – ) | (I4_1, _{(80)}) | (I4_122, _{(98)}) | ||||||
| (h+k+l) | (h+k) | (k+l) | (l=) (4n) |
(k) | (h) | (I – – d) | (I4_1md, _{(109)}) | (Ibar{4}2d, _{(122)}) | ||||||
| (h+k+l) | (h+k) | (k, l) | (l) | (l) | (k) | (I – c – ) | (I4cm, _{( 108)}) | (Ibar{4}c2, _{(120)}) | (I4/mcm, _{(140)}) | |||||
| (h+k+l) | (h+k) | (k, l) | (l=) (4n) |
(k) | (h) | (I – cd) | (I4_1cd, _{(110)}) | |||||||
| (h+k+l) | (h, k) | (k+l) | (l) | (l=) (4n) |
(k) | (I4_1/a – – ) | (I4_1/a, _{(88)}) | |||||||
| (h+k+l) | (h, k) | (k+l) | (l=) (4n) |
(k) | (h) | (Ia – d) | (I4_1/amd, _{(141)}) | |||||||
| (h+k+l) | (h, k) | (k, l) | (l=) (4n) |
(k) | (h) | (Iacd) | (I4_1/acd, _{(142)}) | |||||||
Trigonal trigonal crystal system
Hexagonal axes
| Reflection conditions | Extinction symbol |
Laue class | ||||||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| (bar{3}) | (bar{3}m1, (=bar{3},2/m,1), bar{3}m) | (bar{3}1m, (=bar{3},1, 2/m)) | ||||||||||
| Point group | ||||||||||||
| (hkil) | (hh0l) | (h h overline{2h} l) | (000l) | (3) | (bar{3}) | (321), (32) |
(3m1), (3m) |
(bar{3}m1), (bar{3}m) |
(312) | (31m) | (bar{3}1m) | |
| (P – – – ) | (P3, _{(143)}) | (Pbar{3}, _{(147)}) | (P321, _{(150)}) | (P3m1, _{(156)}) | (Pbar{3}m1, _{(164)}) | (P312, _{(149)}) | (P31m, _{(157)}) | (Pbar{3}1m, _{(162)}) | ||||
| (l) (=3n) |
(P3_1 – – – ) | (P3_1, _{(144)}) (P3_2, _{(145)}) |
(P3_121, _{(152)}) ( P3_221, _{(154)}) |
(P3_112, _{(151)}) ( P3_212, _{(153)}) |
||||||||
| (l) | (l) | (P – – c) | (P31c, _{(159)}) | (Pbar{3}1c, _{(163)}) | ||||||||
| (l) | (l) | (P – c – ) | (P3c1, _{(158)}) | (Pbar{3}c1, _{(165)}) | ||||||||
| ( -h+k+l) (=3n) |
(h+l) (=3n) |
(l) (=3n) |
(l) (=3n) |
(R(obv) – – ) | (R3, _{(146)}) | (Rbar{3}, _{(148)}) | (R32, _{(155)}) | (R3m, _{(160)}) | (Rbar{3}m, _{(166)}) | |||
| ( -h+k+l) (=3n) |
(h+l) (=3n; l) |
(l) (=3n) |
(l) (=6n) |
(R(obv) – c) | (R3c, _{(161)}) | (Rbar{3}c, _{(167)}) | ||||||
| (h- k+l) (=3n) |
( -h+l) (=3n) |
(l) (=3n) |
(l) (=3n) |
(R(rev) – – ) | (R3, _{(146)}) | (Rbar{3}, _{(148)}) | (R32, _{(155)}, ) | (R3m, _{(160)}) | (Rbar{3}m, _{(166)}) | |||
| (h- k+l) (=3n) |
( -h+l) (=3n; l) |
(l) (=3n) |
(l) (=3n) |
(R(rev) – c) | (R3c, _{(161)}) | (Rbar{3}c, _{(167)}) | ||||||
Rhombohedral axes
| Reflection conditions | Extinction symbol |
Point group | ||||||
|---|---|---|---|---|---|---|---|---|
| (hkl) | (hhl) | (hhh) | (3) | (bar{3}) | (32) | (3m) | (bar{3}m) | |
| (R – – ) | (R3, _{(146)}) | (Rbar{3}, _{(148)}) | (R32, _{(155)}) | (R3m, _{(160)}) | (Rbar{3}m, _{(166)}) | |||
| (l) | (h) | (R – c – ) | (R3c, _{(161)}) | (Rbar{3}c, _{(167)}) | ||||
Hexagonal hexagonal crystal system
| Reflection conditions | Extinction symbol |
Laue class | ||||||||
|---|---|---|---|---|---|---|---|---|---|---|
| (6/m) | (6/mmm) | |||||||||
| Point group | ||||||||||
| (hh0l) | (hh2hl) | (000l) | (6) | (bar{6}) | (6/m) | (622) | (6mm) | (bar{6}2m) | (6/mmm) | |
| (bar{6}m2) | ||||||||||
| (P – – – ) | (P6, _{(168)}) | (Pbar{6}, _{(174)}) | (P6/m, _{(175)}) | (P622, _{(177)}) | (P6mm, _{(183)}) | (Pbar{6}2m, _{(189)}) | (P6/mmm, _{(191)}) | |||
| (Pbar{6}m2, _{(187)}) | ||||||||||
| (l) | (P6_3 – – ) | (P6_3, _{(173)}) | (P6_3/m, _{(176)}) | (P6_322, _{(182)}) | ||||||
| (l=3n) | (P6_2 – – ) | (P6_2, _{(171)}) | (P6_222, _{(180)}) | |||||||
| (P6_4, _{(172)}) | (P6_422, _{(181)}) | |||||||||
| (l=6n) | (P6_1 – – ) | (P6_1, _{(169)}) | (P6_122, _{(178)}) | |||||||
| (P6_5, _{(170)}) | (P6_522, _{(179)}) | |||||||||
| (l) | (l) | (P – – c) | (P6_3mc, _{(186)}) | (Pbar{6}2c, _{(190)}) | (P6_3/nmc, _{(194)}) | |||||
| (l) | (l) | (P – c – ) | (P6_3cm, _{(185)}) | (Pbar{6}c2, _{(188)}) | (P6_3/mcm, _{(193)}) | |||||
| (l) | (l) | (l) | (P – cc) | (P6cc, _{(184)}) | (P6/mcc, _{(192)}) | |||||
Cubic cubic crystal system
| Reflection conditions | Extinction symbol |
Laue class | |||||||
|---|---|---|---|---|---|---|---|---|---|
| (m3) | (m3m) | ||||||||
| Point group | |||||||||
| (hkl) | (0kl) | (hhl) | (00l) | (23) | (mbar{3}) | (432) | (bar{4}3m) | (mbar{3}m) | |
| (P – – – ) | (P23, _{(195)}) | (Pmbar{3}, _{(200)}) | (P432, _{(207)}) | (Pbar{4}3m, _{(215)}) | (Pmbar{3}m, _{(221)}) | ||||
| (l) | (P2_1 – -) (P4_2 – -) |
(P2_13, _{(198)}) | (P4_232, _{(208)}) | ||||||
| (l=4n) | (P4_1 – – ) | (P4_132, _{(213)}) (P4_332, _{(212)}) |
|||||||
| (l) | (l) | (P – – n) | (Pbar{4}3n, _{(218)}) | (Pmbar{3}n, _{(223)}) | |||||
| (k) | (l) | (Pa – – ) | (Pabar{3}, _{(205)}) | ||||||
| (k+l) | (l) | (Pn – – ) | (Pnbar{3}, _{(201)}) | (Pnbar{3}m, _{(224)}) | |||||
| (k+l) | (l) | (l) | (Pn – n) | (Pnbar{3}n, _{(222)}) | |||||
| (h+k+l) | (k+l) | (l) | (l) | (I – – – ) | (I23, _{(197)}) (I2_13, _{(199)}) |
(Imbar{3}, _{(204)}) | (I432, _{(211)}) | (Ibar{4}3m, _{(217)}) | (Imbar{3}m, _{(229)}) |
| (h+k+l) | (k+l) | (l) | (l=4n) | (I4_1- -) | (I4_132, _{(214)}) | ||||
| (h+k+l) | (k+l) | (2h+l=4n, l) | (l=4n) | (I – – d) | (Ibar{4}3d, _{(220)}) | ||||
| (h+k+l) | (k, l) | (l) | (l) | (la – – ) | (Iabar{3}, _{(206)}) | ||||
| (h+k+l) | (k, l) | (2h+l=4n, l) | (l=4n) | (Ia – d) | (Iabar{3}d, _{(230)}) | ||||
| (h+k, h+l,) ( k+l) |
(k, l) | (h+l) | (l) | (F) | (F23, _{(196)}) | (Fmbar{3}, _{(202)}) | (F432, _{(209)}) | (Fbar{4}3m, _{(216)}) | (Fmbar{3}m, _{(225)}) |
| (h+k, h+l,) ( k+l) |
(k, l) | (h+l) | (l=4n) | (F4_1 – – ) | (F4_132, _{(210)}) | ||||
| (h+k, h+l,) ( k+l) |
(k, l) | (h, l) | (l) | (F – – c) | (Fbar{4}3c, _{(219)}) | (Fmbar{3}c, _{(226)}) | |||
| (h+k, h+l, ) (k+l) |
(k+l=4n;) (k, l) |
(h+l) | (l=4n) | (Fd – – ) | (Fdbar{3}, _{(203)}) | (Fdbar{3}m, _{(227)}) | |||
| (h+k, h+l, ) (k+l) |
(k+l=4n;) (k, l) |
(h, l) | (l=4n) | (Fd-c) | (Fdbar{3}c, _{(228)}) | ||||
- これはX線や中性子線のような、散乱能が小さく試料中で高々1回程度しか散乱が起きないような入射波を使った場合に成立します。電子線のような散乱能の大きい波を用いた場合、複合格子並進に由来するpresence conditions/systematic absencesは満たすものの、らせん・映進に由来するpresence conditions/systematic absencesは満たされません。 ↩︎