"""
scalepack manual, edition 5, page 141
The space group may be entered as a name (e.g. P212121) or as a number (e.g. 19, for the same space group). Most of the numbers correspond to those of the International Tables. The numbers above 230 are non-standard definitions of space groups.

1 P1
3 P2
4 P21
5 C2
16 P222
17 P2221
18 P21212
19 P212121
20 C2221
21 C222
22 F222
23 I222
24 I212121
75 P4
76 P41
77 P42
78 P43
79 I4
80 I41
89 P422
90 P4212
91 P4122
92 P41212
93 P4222
94 P42212
95 P4322
96 P43212
97 I422
98 I4122
143 P3
144 P31
145 P32
146 R3
149 P312
150 P321
151 P3112
152 P3121
153 P3212
154 P3221
155 R32
168 P6
169 P61
170 P65
171 P62
172 P64
173 P63
177 P622
178 P6122
179 P6522
180 P6222
181 P6422
182 P6322
195 P23
196 F23
197 I23
198 P213
199 I213
207 P432
208 P4232
209 F432
210 F4132
211 I432
212 P4332
213 P4132
214 I4132
303 P2C
305 B2
318 P21221
401 C1
403 P21C
446 H3
455 H32
501 I1
503 I2
505 C21
Notes to particular space groups:
146 R3 R3 in hexagonal setting
446 H3 R3 in primitive setting
155 R32 R32 in hexagonal setting
455 H32 R32 in primitive setting
401 C1 Non-standard, but useful to make angles close to 90.
501 I1 Non-standard, but useful to make angles close to 90.
303 P2C P2, C axis unique
403 P21C P21, C axis unique
305 B2 like C2, B face centered, c axis unique
503 I2 Non-standard, but useful to make beta angle close to 90.
"""
from __future__ import absolute_import, division, print_function