
                   SYMMETRYGROUP      

Space group      : 215 - PB43M
Point group      :  36 - TD
Inversion        : no 

                   OPERATIONS      


(The XYZ-operation symbols "(A,B,C)+(t1,t2,t3)" mean:
 if a vector is given relative to the lattice basis vectors 
 r=X*a1+Y*a2+Z*a3 then it is transformed into
 r'=(A+t1)*a1+(B+t2)*a2+(C+t3)*a2,
 for RTG lattices the operations refer to the corresponding
 STG unit cell!)


Group Generators      : 2
Index   rotation       : symbol
46:   (+Y  ,-X  ,-Z  ) :   S3/4(z) 
 9:   (+Z  ,+X  ,+Y  ) :   C1/3(111) 

Full Group Operations : 24
Index   rotation       : symbol
 0:   (+X  ,+Y  ,+Z  ) :   E 
 1:   (-X  ,+Y  ,-Z  ) :   C2(y) 
 2:   (+X  ,-Y  ,-Z  ) :   C2(x) 
 3:   (-X  ,-Y  ,+Z  ) :   C2(z) 
 4:   (-Y  ,+Z  ,-X  ) :   C1/3(-111) 
 5:   (-Y  ,-Z  ,+X  ) :   C1/3(1-11) 
 6:   (+Y  ,-Z  ,-X  ) :   C2/3(-1-11) 
 7:   (+Y  ,+Z  ,+X  ) :   C2/3(111) 
 8:   (-Z  ,-X  ,+Y  ) :   C2/3(-111) 
 9:   (+Z  ,+X  ,+Y  ) :   C1/3(111) 
10:   (+Z  ,-X  ,-Y  ) :   C2/3(1-11) 
11:   (-Z  ,+X  ,-Y  ) :   C1/3(-1-11) 
44:   (-Y  ,-X  ,+Z  ) :   s(xy) 
45:   (-Y  ,+X  ,-Z  ) :   S1/4(z) 
46:   (+Y  ,-X  ,-Z  ) :   S3/4(z) 
47:   (+Y  ,+X  ,+Z  ) :   s(x-y) 
48:   (-Z  ,+Y  ,-X  ) :   s(xz) 
49:   (+Z  ,+Y  ,+X  ) :   s(x-z) 
50:   (+Z  ,-Y  ,-X  ) :   S1/4(y) 
51:   (-Z  ,-Y  ,+X  ) :   S3/4(y) 
52:   (+X  ,+Z  ,+Y  ) :   s(y-z) 
53:   (-X  ,-Z  ,+Y  ) :   S1/4(x) 
54:   (+X  ,-Z  ,-Y  ) :   s(yz) 
55:   (-X  ,+Z  ,-Y  ) :   S3/4(x) 


