Get the Seitz notation of the space group symmetries for a specific crystal structure.

[hongyi-zhao]

For wurtzite MnO, the description given by ICSD is as follows:

$ cat ICSD_CollCode262928.cif 

#(C) 2021 by FIZ Karlsruhe - Leibniz Institute for Information Infrastructure.  All rights reserved.
data_262928-ICSD
_database_code_ICSD 262928
_audit_creation_date 2012-08-01
_chemical_name_common 'Manganese oxide (1/1)'
_chemical_formula_structural 'Mn O'
_chemical_formula_sum 'Mn1 O1'
_chemical_name_structure_type Wurtzite#ZnS(2H)
_exptl_crystal_density_diffrn 4.44
_citation_title

;
New crystal structure: synthesis and characterization of hexagonal wurtzite Mn
O
;
loop_
_citation_id
_citation_journal_full
_citation_year
_citation_journal_volume
_citation_page_first
_citation_page_last
_citation_journal_id_ASTM
primary 'Journal of the American Chemical Society' 2012 134 8392 8395 JACSAT
loop_
_citation_author_citation_id
_citation_author_name
primary 'Nam Ki Min'
primary 'Kim Yong-Il'
primary 'Jo Younghun'
primary 'Lee Seung Mi'
primary 'Kim Bog G.'
primary 'Choi Ran'
primary 'Choi Sang-Il'
primary 'Song Hyunjoon'
primary 'Park Joon T.'
_cell_length_a 3.3717
_cell_length_b 3.3717
_cell_length_c 5.3855(7)
_cell_angle_alpha 90.
_cell_angle_beta 90.
_cell_angle_gamma 120.
_cell_volume 53.02
_cell_formula_units_Z 2
_space_group_name_H-M_alt 'P 63 m c'
_space_group_IT_number 186
loop_
_space_group_symop_id
_space_group_symop_operation_xyz
1 '-x, -x+y, z+1/2'
2 'x-y, -y, z+1/2'
3 'y, x, z+1/2'
4 'x-y, x, z+1/2'
5 'y, -x+y, z+1/2'
6 '-x, -y, z+1/2'
7 'x, x-y, z'
8 '-x+y, y, z'
9 '-y, -x, z'
10 '-x+y, -x, z'
11 '-y, x-y, z'
12 'x, y, z'
loop_
_atom_type_symbol
_atom_type_oxidation_number
Mn2+ 2
O2- -2
loop_
_atom_site_label
_atom_site_type_symbol
_atom_site_symmetry_multiplicity
_atom_site_Wyckoff_symbol
_atom_site_fract_x
_atom_site_fract_y
_atom_site_fract_z
_atom_site_U_iso_or_equiv
_atom_site_occupancy
Mn1 Mn2+ 2 b 0.33333 0.66667 0.01096 0.04952 1.
O1 O2- 2 b 0.33333 0.66667 0.37547 0.03911 1.

And I also noticed the following description of this material:

If I understand correctly, the Seitz symbol of the space group[1-3] is used here. So, I want to know if SpaceGroupIrep can get the similar information based on the cif file for a specific crystal structure. See here, here, and here for related discussions.

[1] https://www.cryst.ehu.es/html/cryst/help_pop-up/seitz_symbol.html
[2] https://www.cryst.ehu.es/cryst/seitz_help.html
[3] https://journals.iucr.org/a/issues/2011/04/00/pz5089/pz5089sup1.pdf

Regards,
HZ

[goodluck1982]

You can try the getBCsymmetry.py tool.
When I run this tool, I get the following results (if default precicion (-p) 1e-5 is used, space group No. 36 is obtained):

getBCsymmetry.py -c MnO.cif -p 0.0001
# Space group: P6_3mc 186

# Symmetry operations:
# (R0,v0):      Operations on the input structure.
# (Rs,vs):      Standard operations in spglib, the same as ITA, using conventional basic vectors.
# (RBC2,vBC2):  The operations in the 2nd line of my revised BC Tab.3.7, transformed from the standard ITA
#               operations by Q matrix, using the BC basic vectors in Tab.3.1 [note(v) for space group 38-41].
# (RBC1,vBC1):  The operations using by BC, i.e. the 1st line of BC Tab.3.7.

#    (R0,v0)                         (Rs,vs)                       (RBC2,vBC2)                       (RBC1,vBC1)
# 1   : E                               E                               E                               E
   1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000
   0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000
# 2   : C6+                             C6+                             C6+                             C6+
   1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000
   1   0   0    0.99999000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000
# 3   : C3+                             C3+                             C3+                             C3+
   0  -1   0    0.00001000         0  -1   0    1.00000000         0  -1   0    1.00000000         0  -1   0    1.00000000
   1  -1   0    0.99999000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000
# 4   : C2                              C2                              C2                              C2
  -1   0   0    0.00002000        -1   0   0    2.00000000        -1   0   0    2.00000000        -1   0   0    2.00000000
   0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000
# 5   : C3-                             C3-                             C3-                             C3-
  -1   1   0    0.00002000        -1   1   0    2.00000000        -1   1   0    2.00000000        -1   1   0    2.00000000
  -1   0   0    0.00001000        -1   0   0    1.00000000        -1   0   0    1.00000000        -1   0   0    1.00000000
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000
# 6   : C6-                             C6-                             C6-                             C6-
   0   1   0    0.00001000         0   1   0    1.00000000         0   1   0    1.00000000         0   1   0    1.00000000
  -1   1   0    0.00001000        -1   1   0    1.00000000        -1   1   0    1.00000000        -1   1   0    1.00000000
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000
# 7   : md3                             md3                             md3                             md3
   0   1   0    0.00001000         0   1   0    1.00000000         0   1   0    1.00000000         0   1   0    1.00000000
   1   0   0    0.99999000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000
# 8   : mv2                             mv2                             mv2                             mv2
   1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000
   1  -1   0    0.99999000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000
# 9   : md1                             md1                             md1                             md1
   1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000
   0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000
# 10  : mv3                             mv3                             mv3                             mv3
   0  -1   0    0.00001000         0  -1   0    1.00000000         0  -1   0    1.00000000         0  -1   0    1.00000000
  -1   0   0    0.00001000        -1   0   0    1.00000000        -1   0   0    1.00000000        -1   0   0    1.00000000
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000
# 11  : md2                             md2                             md2                             md2
  -1   0   0    0.00002000        -1   0   0    2.00000000        -1   0   0    2.00000000        -1   0   0    2.00000000
  -1   1   0    0.00001000        -1   1   0    1.00000000        -1   1   0    1.00000000        -1   1   0    1.00000000
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000
# 12  : mv1                             mv1                             mv1                             mv1
  -1   1   0    0.00002000        -1   1   0    2.00000000        -1   1   0    2.00000000        -1   1   0    2.00000000
   0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000

# transformation_matrix [P]: (a0,b0,c0)=(as,bs,cs).P, and  origin_shift p0 = O - Os:
    1                0                0                               0.9999900000
    0                1                0                               0.0000000000
    0                0                1                               0.0000000000
# std_rotation_matrix   (R): (as',bs',cs')=(R.as,R.bs,R.cs)
    1                0                0
    0                1                0
    0                0                1
# transformation matrix [Q]: (t1BC2,t2BC2,t3BC2)=(as',bs',cs').Q
    1                0                0
    0                1                0
    0                0                1
# transformation matrix [U]:  and origin shift t0 = OBC2-OBC1: (t1BC1,t2BC1,t3BC1)=(t1BC2,t2BC2,t3BC2).U
    1                0                0                               0.0000000000
    0                1                0                               0.0000000000
    0                0                1                               0.0000000000
# rotation matrix       (S): (t1,t2,t3)=S.(t1BC1,t2BC1,t3BC1)
    0                1                0
   -1                0                0
    0                0                1

L0  =(a0,b0,c0)^T              Ls  =(as,bs,cs)^T              Lsi=(as',bs',cs')^T
LBC2=(t1BC2,t2BC2,t3BC2)^T     LBC1=(t1BC1,t2BC1,t3BC1)^T     LBC=(t1,t2,t3)^T
Lattice change process, standardization first, then idealization, then to BC lattices.
    L0  ==[P^-1]==>  Ls  ==(R)==>  Lsi  ==[Q]==>  LBC2  ==[U]==>  LBC1  ==(S)==>  LBC
 (R0,v0)          (Rs,vs)       (Rs,vs)        (RBC2,vBC2)     (RBC1,vBC1)     (RBC1,vBC1)

               (1). L0                                (2). Ls                                (3). Lsi
 [ 3.3717     0          0        ]     [ 3.3717     0          0        ]     [ 3.3717     0          0        ]
 |-1.68585    2.919978   0        | =>  |-1.68585    2.919978   0        | =>  |-1.68585    2.919978   0        |
 [ 0          0          5.3855   ]     [ 0          0          5.3855   ]     [ 0          0          5.3855   ]

               (4). LBC2                              (5). LBC1                              (6). LBC
 [ 3.3717     0          0        ]     [ 3.3717     0          0        ]     [ 0         -3.3717     0        ]
 |-1.68585    2.919978   0        | =>  |-1.68585    2.919978   0        | =>  | 2.919978   1.68585    0        |
 [ 0          0          5.3855   ]     [ 0          0          5.3855   ]     [ 0          0          5.3855   ]

BZ type is:  HexaPrim

The last column (RBC1,vBC1) gives the rotation matrixes and names, and translations. So the Seitz symbol is just {RBC1|vBC1}. But note that the rotation names here conform to the BC convention. And for the cell conversion procedure, please refer to Comput. Phys. Commun. 265 , 107993 (2021) for detail.

[hongyi-zhao]

You can try the getBCsymmetry.py tool.
When I run this tool, I get the following results (if default precicion (-p) 1e-5 is used, space group No. 36 is obtained):

See here and here for the related discussions.

[hongyi-zhao]

The last column (RBC1,vBC1) gives the rotation matrixes and names, and translations. So the Seitz symbol is just {RBC1|vBC1}.

Thank you for your wonderful work. I also got the above results given by you. The specific steps are as follows:

$ pyenv shell datasci
$ python --version
Python 3.9.1

# https://github.com/jamesrhester/pycifrw
$ pip install pycifrw 

$ python getBCsymmetry.py -c ~/Downloads/caj/spin-gapless/ICSD_CollCode262928.cif -p 0.0001
# Space group: P6_3mc 186 

# Symmetry operations:
# (R0,v0):      Operations on the input structure.
# (Rs,vs):      Standard operations in spglib, the same as ITA, using conventional basic vectors.
# (RBC2,vBC2):  The operations in the 2nd line of my revised BC Tab.3.7, transformed from the standard ITA
#               operations by Q matrix, using the BC basic vectors in Tab.3.1 [note(v) for space group 38-41].
# (RBC1,vBC1):  The operations using by BC, i.e. the 1st line of BC Tab.3.7.

#    (R0,v0)                         (Rs,vs)                       (RBC2,vBC2)                       (RBC1,vBC1)
# 1   : E                               E                               E                               E    
   1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000 
   0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000 
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000 
# 2   : C6+                             C6+                             C6+                             C6+  
   1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000 
   1   0   0    0.99999000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000 
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000 
# 3   : C3+                             C3+                             C3+                             C3+  
   0  -1   0    0.00001000         0  -1   0    1.00000000         0  -1   0    1.00000000         0  -1   0    1.00000000 
   1  -1   0    0.99999000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000 
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000 
# 4   : C2                              C2                              C2                              C2   
  -1   0   0    0.00002000        -1   0   0    2.00000000        -1   0   0    2.00000000        -1   0   0    2.00000000 
   0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000 
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000 
# 5   : C3-                             C3-                             C3-                             C3-  
  -1   1   0    0.00002000        -1   1   0    2.00000000        -1   1   0    2.00000000        -1   1   0    2.00000000 
  -1   0   0    0.00001000        -1   0   0    1.00000000        -1   0   0    1.00000000        -1   0   0    1.00000000 
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000 
# 6   : C6-                             C6-                             C6-                             C6-  
   0   1   0    0.00001000         0   1   0    1.00000000         0   1   0    1.00000000         0   1   0    1.00000000 
  -1   1   0    0.00001000        -1   1   0    1.00000000        -1   1   0    1.00000000        -1   1   0    1.00000000 
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000 
# 7   : md3                             md3                             md3                             md3  
   0   1   0    0.00001000         0   1   0    1.00000000         0   1   0    1.00000000         0   1   0    1.00000000 
   1   0   0    0.99999000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000 
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000 
# 8   : mv2                             mv2                             mv2                             mv2  
   1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000         1   0   0    0.00000000 
   1  -1   0    0.99999000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000 
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000 
# 9   : md1                             md1                             md1                             md1  
   1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000         1  -1   0    0.00000000 
   0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000         0  -1   0    0.00000000 
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000 
# 10  : mv3                             mv3                             mv3                             mv3  
   0  -1   0    0.00001000         0  -1   0    1.00000000         0  -1   0    1.00000000         0  -1   0    1.00000000 
  -1   0   0    0.00001000        -1   0   0    1.00000000        -1   0   0    1.00000000        -1   0   0    1.00000000 
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000 
# 11  : md2                             md2                             md2                             md2  
  -1   0   0    0.00002000        -1   0   0    2.00000000        -1   0   0    2.00000000        -1   0   0    2.00000000 
  -1   1   0    0.00001000        -1   1   0    1.00000000        -1   1   0    1.00000000        -1   1   0    1.00000000 
   0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000         0   0   1    0.50000000 
# 12  : mv1                             mv1                             mv1                             mv1  
  -1   1   0    0.00002000        -1   1   0    2.00000000        -1   1   0    2.00000000        -1   1   0    2.00000000 
   0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000         0   1   0    0.00000000 
   0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000         0   0   1    0.00000000 

# transformation_matrix [P]: (a0,b0,c0)=(as,bs,cs).P, and  origin_shift p0 = O - Os:
    1                0                0                               0.9999900000
    0                1                0                               0.0000000000
    0                0                1                               0.0000000000
# std_rotation_matrix   (R): (as',bs',cs')=(R.as,R.bs,R.cs)
    1                0                0              
    0                1                0              
    0                0                1              
# transformation matrix [Q]: (t1BC2,t2BC2,t3BC2)=(as',bs',cs').Q
    1                0                0              
    0                1                0              
    0                0                1              
# transformation matrix [U]:  and origin shift t0 = OBC2-OBC1: (t1BC1,t2BC1,t3BC1)=(t1BC2,t2BC2,t3BC2).U
    1                0                0                               0.0000000000
    0                1                0                               0.0000000000
    0                0                1                               0.0000000000
# rotation matrix       (S): (t1,t2,t3)=S.(t1BC1,t2BC1,t3BC1)
    0                1                0              
   -1                0                0              
    0                0                1              

L0  =(a0,b0,c0)^T              Ls  =(as,bs,cs)^T              Lsi=(as',bs',cs')^T           
LBC2=(t1BC2,t2BC2,t3BC2)^T     LBC1=(t1BC1,t2BC1,t3BC1)^T     LBC=(t1,t2,t3)^T              
Lattice change process, standardization first, then idealization, then to BC lattices.
    L0  ==[P^-1]==>  Ls  ==(R)==>  Lsi  ==[Q]==>  LBC2  ==[U]==>  LBC1  ==(S)==>  LBC
 (R0,v0)          (Rs,vs)       (Rs,vs)        (RBC2,vBC2)     (RBC1,vBC1)     (RBC1,vBC1)

               (1). L0                                (2). Ls                                (3). Lsi
 [ 3.3717     0          0        ]     [ 3.3717     0          0        ]     [ 3.3717     0          0        ]  
 |-1.68585    2.919978   0        | =>  |-1.68585    2.919978   0        | =>  |-1.68585    2.919978   0        |  
 [ 0          0          5.3855   ]     [ 0          0          5.3855   ]     [ 0          0          5.3855   ]   

               (4). LBC2                              (5). LBC1                              (6). LBC
 [ 3.3717     0          0        ]     [ 3.3717     0          0        ]     [ 0         -3.3717     0        ]  
 |-1.68585    2.919978   0        | =>  |-1.68585    2.919978   0        | =>  | 2.919978   1.68585    0        |  
 [ 0          0          5.3855   ]     [ 0          0          5.3855   ]     [ 0          0          5.3855   ]   

BZ type is:  HexaPrim 

But note that the rotation names here conform to the BC convention. And for the cell conversion procedure, please refer to Comput. Phys. Commun. 265 , 107993 (2021) for detail.

Thank you for letting me know the excellent work of your group. I would like to give some additional comments as follows:

1. According to the comment here:

For rotations and rotoinversions of order higher than 2, 
a superscript + or - is used to indicate the sense of the rotation. 
The subscripts of the symbols R denote the characteristic direction of the operation.

So, it seems that, for example, the C6+ in the output can also be written as 6^+_z, 6^+_[001], or 6^+_001.

2. Furthermore, according to the notations given here, the + indicating clockwise rotation is usually omitted, so the above notations can also be written as: 6_z, 6_[001], or 6_001.

[hongyi-zhao]

Let's put the above result we get from the getBCsymmetry.py script aside for now. Intuitively, another question I can't understand most is the following symmetry for the material discussed in the paper:

C̃_6z = { C_6z | 0 , 0 , 1/2 }

More specifically, according to the description here, the Cartesian Representation Matrices for Point Group C6 have the following forms:

=== begin ===
Symmetry Element / Class: C6
(C6)5
Character / Trace:2.0000
Determinant:1.0000

Rotation Axis
0.00000.00001.0000
Rotation Angle
φ = 60.0°

Representation Matrix
0.5000-0.86600.0000
0.86600.50000.0000
0.00000.00001.0000

Rotation Axis
0.00000.00001.0000
Rotation Angle
φ = 300.0°

Representation Matrix
0.50000.86600.0000
-0.86600.50000.0000
0.00000.00001.0000
=== end ===

However, I cannot find the operation corresponding to the above representation from the operators given in the CIF file:

_space_group_symop_operation_xyz
1 '-x, -x+y, z+1/2'
2 'x-y, -y, z+1/2'
3 'y, x, z+1/2'
4 'x-y, x, z+1/2'
5 'y, -x+y, z+1/2'
6 '-x, -y, z+1/2'
7 'x, x-y, z'
8 '-x+y, y, z'
9 '-y, -x, z'
10 '-x+y, -x, z'
11 '-y, x-y, z'
12 'x, y, z'

Regards,
HZ

[goodluck1982]

But note that the rotation names here conform to the BC convention. And for the cell conversion procedure, please refer to Comput. Phys. Commun. 265 , 107993 (2021) for detail.

Thank you for letting me know the excellent work of your group. I would like to give some additional comments as follows:

1. According to the comment here:

For rotations and rotoinversions of order higher than 2, 
a superscript + or - is used to indicate the sense of the rotation. 
The subscripts of the symbols R denote the characteristic direction of the operation.

So, it seems that, for example, the C6+ in the output can also be written as 6^+z, 6^+[001], or 6^+_001.

Yes, the notation is just a name. In principle everyone can use his/her favourite name. We use the name convention in the BC book ( the book “The mathematical theory of symmetry in solids” by C. J. Bradley & A. P. Cracknell) which is different from the names of BCS (Bilbao Crystallographic Server).

2. Furthermore, according to the notations given here, the + indicating clockwise rotation is usually omitted, so the above notations can also be written as: 6_z, 6_[001], or 6_001

[goodluck1982]

Yes, the cif file does not give the Cartesian Representation Matrices. The 4th operation 4 'x-y, x, z+1/2' is just {C6z|1/2}，and x-y, x, z means the C6z (C6+). The notation such as x-y,x,z is called "Jones' faithful representation symbols", as given in the following table in the BC book.

Note that Jones' symbol depneds on the definition of the primitive cell. Different primitive cells will give different Jones' symbols, even if they may all mean the same rotation, say, C6z.

However, I cannot find the operation corresponding to the above representation in the CIF file, as indicated by the following part:

_space_group_symop_operation_xyz
1 '-x, -x+y, z+1/2'
2 'x-y, -y, z+1/2'
3 'y, x, z+1/2'
4 'x-y, x, z+1/2'
5 'y, -x+y, z+1/2'
6 '-x, -y, z+1/2'
7 'x, x-y, z'
8 '-x+y, y, z'
9 '-y, -x, z'
10 '-x+y, -x, z'
11 '-y, x-y, z'
12 'x, y, z'

[hongyi-zhao]

The 4th operation 4 'x-y, x, z+1/2' is just {C6z|1/2}，and x-y, x, z means the C6z (C6+).

Note that Jones' symbol depneds on the definition of the primitive cell.

Thank you very much. Got it. These operations are defined using the fractional coordinates, with the primitive cell basis vectors as the unit vector of the coordinate axis. So, taking 'x-y, x, z+1/2' as an example, it is equivalent to the following operations on the 'x, y, z': A 60-degree clockwise rotation relative to the original coordinate system in (x, y) plane, and one more operation that translates the z-axis positively by 1/2 z-axis length.

[goodluck1982]

The 4th operation 4 'x-y, x, z+1/2' is just {C6z|1/2}，and x-y, x, z means the C6z (C6+).

Note that Jones' symbol depneds on the definition of the primitive cell.

Thank you very much. Got it. These operations are defined using the fractional coordinates, with the primitive cell basis vectors as the unit vector of the coordinate axis. So, taking 'x-y, x, z+1/2' as an example, it is equivalent to the following operations on the 'x, y, z': A 60-degree clockwise rotation relative to the original coordinate system in (x, y) plane, and one more operation that translates the z-axis positively by 1/2 z-axis length.

x-y, x, z is a 60-degree anticlockwise rotation

[hongyi-zhao]

x-y, x, z is a 60-degree anticlockwise rotation

See my following sketch representing the 'x-y, x, z+1/2' operation on a P63mc primitive cell:

Where did I go wrong?

[goodluck1982]

See my following sketch for a P63mc primitive cell to represent the 'x-y, x, z+1/2' operation:

x,y,z are not basic vectors, but the coordinates/components.
The matrix of C6+ is

And hence

[hongyi-zhao]

It seems that this is the so-called relationship between active and passive transformation. The object in a coordinate system has been rotated 60 degrees clockwise, which corresponds to the basic vector/coordinate axis rotating 60 degrees counterclockwise. I redrawn a sketch as shown below:

As you can see, from the active transformation point of view, this is done by rotating 60 degree anticlockwise around the c axis in the ab plane. See here for a detailed explanation of fractional coordinates in the real-space coordinate system used by crystallographers.

I also checked the above matrix dot product relation in Mathematica:

[goodluck1982]

It seems that this is the so-called relationship between active and passive transformation. The object in a coordinate system has been rotated 60 degrees clockwise, which corresponds to the basic vector/coordinate axis rotating 60 degrees counterclockwise.

I also checked the above matrix dot product relation in Mathematica:

Yes, the BC book uses the active viewpoint.
I also prefer the active viewpoint.
Because I think the active viewpoint is direct and intuitive.

[hongyi-zhao]

The notation such as x-y,x,z is called "Jones' faithful representation symbols", as given in the following table in the BC book.

BTW, if I understand correctly, the "Jones' faithful representation" should belong to one type of the Faithful_representation.