Fddd

Number70
Symmetry Classorthorhombic
ChiralN

s-nets

816 records listed.
Image s-net name Other names Space group Space group number Symmetry class Vertex degree(s) Vertices per primitive unit cell Transitivity (Vertex, Edge)
Full image sqc11464 Fddd 70 orthorhombic {4,8,3,4,4} 24 (5,7)
Full image sqc11465 Fddd 70 orthorhombic {4,8,3,4,4} 24 (5,7)
Full image sqc11494 Fddd 70 orthorhombic {4,4,4,6,4} 24 (5,7)
Full image sqc11502 Fddd 70 orthorhombic {4,6,4,4,4} 24 (5,7)
Full image sqc11503 Fddd 70 orthorhombic {4,6,4,4,4} 24 (5,7)
Full image sqc11504 Fddd 70 orthorhombic {4,6,4,4,4} 24 (5,7)
Full image sqc11505 Fddd 70 orthorhombic {4,6,4,4,4} 24 (5,7)
Full image sqc11506 Fddd 70 orthorhombic {4,6,4,4,4} 24 (5,7)
Full image sqc11507 Fddd 70 orthorhombic {4,4,4,6,4} 24 (5,7)
Full image sqc11510 Fddd 70 orthorhombic {4,4,6,4,4} 24 (5,7)
Full image sqc11512 Fddd 70 orthorhombic {4,4,6,4,4} 24 (5,7)
Full image sqc11538 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11539 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11540 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11543 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11544 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11558 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11559 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11560 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11563 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11564 Fddd 70 orthorhombic {3,5,5} 24 (3,7)
Full image sqc11577 Fddd 70 orthorhombic {4,4,3,4,4} 28 (5,7)
Full image sqc11578 Fddd 70 orthorhombic {4,4,3,4,4} 28 (5,7)
Full image sqc11583 Fddd 70 orthorhombic {4,3,4,4,4} 28 (5,7)
Full image sqc11584 Fddd 70 orthorhombic {4,3,4,4,4} 28 (5,7)
Full image sqc11585 Fddd 70 orthorhombic {4,3,4,4,4} 28 (5,7)
Full image sqc11586 Fddd 70 orthorhombic {4,3,4,4,4} 28 (5,7)
Full image sqc11588 Fddd 70 orthorhombic {4,3,4,4,4} 28 (5,7)
Full image sqc11774 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11775 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11780 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11781 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11785 Fddd 70 orthorhombic {6,4,4} 24 (3,8)
Full image sqc11790 Fddd 70 orthorhombic {6,4,4} 24 (3,8)
Full image sqc11791 Fddd 70 orthorhombic {6,4,4} 24 (3,8)
Full image sqc11793 Fddd 70 orthorhombic {6,4,4} 24 (3,8)
Full image sqc11803 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11818 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11819 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11823 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11826 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11828 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11829 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11833 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11838 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11839 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11840 Fddd 70 orthorhombic {8,3,3} 24 (3,8)
Full image sqc11845 Fddd 70 orthorhombic {6,4,4} 24 (3,8)
Full image sqc11884 Fddd 70 orthorhombic {4,8,8,4,4} 20 (5,7)
Full image sqc11891 Fddd 70 orthorhombic {4,8,8,4,4} 20 (5,7)
Full image sqc11912 Fddd 70 orthorhombic {4,6,6} 20 (3,7)
Full image sqc11914 Fddd 70 orthorhombic {4,6,6} 20 (3,7)
Full image sqc11950 Fddd 70 orthorhombic {4,5,5} 24 (3,8)
Full image sqc11951 Fddd 70 orthorhombic {4,5,5} 24 (3,8)
Full image sqc11957 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11968 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11969 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11970 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11980 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11981 Fddd 70 orthorhombic {4,4,4,4,4} 28 (5,8)
Full image sqc11990 Fddd 70 orthorhombic {3,3,4,4,4,4} 32 (6,7)
Full image sqc11994 Fddd 70 orthorhombic {3,3,4,4,4,4} 32 (6,7)
Full image sqc12009 Fddd 70 orthorhombic {3,3,4,4} 32 (4,7)
Full image sqc12010 Fddd 70 orthorhombic {3,3,4,4} 32 (4,7)
Full image sqc12058 Fddd 70 orthorhombic {7,4,4} 24 (3,8)
Full image sqc12062 Fddd 70 orthorhombic {7,4,4} 24 (3,8)
Full image sqc12063 Fddd 70 orthorhombic {7,4,4} 24 (3,8)
Full image sqc12072 Fddd 70 orthorhombic {5,5,5} 24 (3,8)
Full image sqc12073 Fddd 70 orthorhombic {5,5,5} 24 (3,8)
Full image sqc12074 Fddd 70 orthorhombic {5,5,5} 24 (3,8)
Full image sqc12075 Fddd 70 orthorhombic {5,5,5} 24 (3,8)
Full image sqc12077 Fddd 70 orthorhombic {4,4,4,3,4,4} 32 (6,8)
Full image sqc12079 Fddd 70 orthorhombic {4,4,4,3,4,4} 32 (6,8)
Full image sqc12080 Fddd 70 orthorhombic {4,4,4,3,4,4} 32 (6,8)
Full image sqc12081 Fddd 70 orthorhombic {4,4,3,4,4,4} 32 (6,8)
Full image sqc12082 Fddd 70 orthorhombic {4,4,3,4,4,4} 32 (6,8)
Full image sqc12087 Fddd 70 orthorhombic {4,4,3,4,4,4} 32 (6,8)
Full image sqc12103 Fddd 70 orthorhombic {7,4,4} 24 (3,8)
Full image sqc12104 Fddd 70 orthorhombic {7,4,4} 24 (3,8)
Full image sqc12107 Fddd 70 orthorhombic {5,5,5} 24 (3,8)
Full image sqc12179 Fddd 70 orthorhombic {3,6,6} 24 (3,8)
Full image sqc12180 Fddd 70 orthorhombic {3,6,6} 24 (3,8)
Full image sqc12181 Fddd 70 orthorhombic {3,6,6} 24 (3,8)
Full image sqc12182 Fddd 70 orthorhombic {3,6,6} 24 (3,8)
Full image sqc12183 Fddd 70 orthorhombic {3,6,6} 24 (3,8)
Full image sqc12235 Fddd 70 orthorhombic {4,3,4,4,4,4} 32 (6,8)
Full image sqc12236 Fddd 70 orthorhombic {4,3,4,4,4,4} 32 (6,8)
Full image sqc12237 Fddd 70 orthorhombic {4,3,4,4,4,4} 32 (6,8)
Full image sqc12254 Fddd 70 orthorhombic {4,4,4,3,4,4} 32 (6,8)
Full image sqc12255 Fddd 70 orthorhombic {4,4,4,3,4,4} 32 (6,8)
Full image sqc12256 Fddd 70 orthorhombic {4,4,3,4,4,4} 32 (6,8)
Full image sqc12257 Fddd 70 orthorhombic {4,4,3,4,4,4} 32 (6,8)
Full image sqc12262 Fddd 70 orthorhombic {4,3,4,4,4,4} 32 (6,8)
Full image sqc12263 Fddd 70 orthorhombic {4,3,4,4,4,4} 32 (6,8)
Full image sqc12380 Fddd 70 orthorhombic {4,4,8,4,4,4} 28 (6,8)
Full image sqc12381 Fddd 70 orthorhombic {4,4,8,4,4,4} 28 (6,8)
Full image sqc12382 Fddd 70 orthorhombic {4,4,8,4,4,4} 28 (6,8)
Full image sqc12383 Fddd 70 orthorhombic {4,4,8,4,4,4} 28 (6,8)
Full image sqc12386 Fddd 70 orthorhombic {4,4,8,4,4,4} 28 (6,8)
Full image sqc12393 Fddd 70 orthorhombic {4,4,4,8,4,4} 28 (6,8)