s-net search

Glossary of terms

s-net name	e.g. sqc5432
Other name
Symmetry class
Space group
Vertex transitivity
Edge transitivity
Vertices per primitive unit cell
Vertex degree(s)
Coordination sequence	any subsequence separated by spaces e.g. 4 12 30
Shortest cycle

14646 records listed.

s-net name	Other names	Space group	Space group number	Symmetry class	Vertex degree(s)	Vertices per primitive unit cell	Transitivity (Vertex, Edge)
sqc600		Pmmm	47	orthorhombic	{7,4}	4	(2,6)
sqc601		P222	16	orthorhombic	{7,4}	4	(2,6)
sqc602		P222	16	orthorhombic	{4,3,8,4}	5	(4,6)
sqc603		Pmmm	47	orthorhombic	{4,8,4,3}	5	(4,6)
sqc604		Pmmm	47	orthorhombic	{3,4,8,4}	5	(4,6)
sqc605		Cmmm	65	orthorhombic	{6,5}	4	(2,5)
sqc606		Pmmm	47	orthorhombic	{4,4,6,4}	5	(4,6)
sqc607		Pmmm	47	orthorhombic	{6,4,4,4}	5	(4,6)
sqc608		Pmmm	47	orthorhombic	{6,4,4,4}	5	(4,6)
sqc609		Pmmm	47	orthorhombic	{6,4,4,4}	5	(4,6)
sqc610		P222	16	orthorhombic	{4,4,6,4}	5	(4,6)
sqc611		Pmmm	47	orthorhombic	{6,5}	4	(2,6)
sqc612		Pmmm	47	orthorhombic	{6,5}	4	(2,6)
sqc613		Cmmm	65	orthorhombic	{6,5}	4	(2,5)
sqc614		Pmmm	47	orthorhombic	{5,6}	4	(2,6)
sqc615		Pmmm	47	orthorhombic	{5,6}	4	(2,6)
sqc616		Pmmm	47	orthorhombic	{8,3,4,4}	5	(4,6)
sqc617		Pmmm	47	orthorhombic	{4,4,4,4,3}	6	(5,5)
sqc618		Pmmm	47	orthorhombic	{4,6,8,4}	4	(4,5)
sqc619		Pmmm	47	orthorhombic	{6,4,4,4}	5	(4,6)
sqc620		Pmmm	47	orthorhombic	{3,8,4,4}	5	(4,6)
sqc621		Pmmm	47	orthorhombic	{4,6,4,4}	5	(4,6)
sqc622		Pmmm	47	orthorhombic	{4,3,4,4,4}	6	(5,5)
sqc623		Pmmm	47	orthorhombic	{4,4,3,4,4}	6	(5,5)
sqc624		Pmmm	47	orthorhombic	{4,3,4,4,4}	6	(5,5)
sqc625		P222	16	orthorhombic	{4,3,4,4}	6	(4,6)
sqc626		Pmmm	47	orthorhombic	{6,4,4,4}	5	(4,6)
sqc627		Pmmm	47	orthorhombic	{4,4,6,4}	5	(4,6)
sqc628		Pmmm	47	orthorhombic	{4,4,3,4}	6	(4,6)
sqc629		Pmmm	47	orthorhombic	{4,4,3,4}	6	(4,6)
sqc630		P222	16	orthorhombic	{4,4,3,4}	6	(4,6)
sqc631		Pmmm	47	orthorhombic	{4,4,4,3}	6	(4,6)
sqc632		Pmmm	47	orthorhombic	{3,4,4,4}	6	(4,6)
sqc633		Pmmm	47	orthorhombic	{4,4,4,3}	6	(4,6)
sqc634		Pmmm	47	orthorhombic	{4,4,3,4}	6	(4,6)
sqc635		Pmmm	47	orthorhombic	{8,3,4,4}	5	(4,6)
sqc636		Pmmm	47	orthorhombic	{4,3,4,4}	6	(4,6)
sqc637		Pmmm	47	orthorhombic	{3,4,4,4}	6	(4,6)
sqc638		Pmmm	47	orthorhombic	{4,3,4,4}	6	(4,6)
sqc639		Pmmm	47	orthorhombic	{4,3,4,4}	6	(4,6)
sqc640		P222	16	orthorhombic	{3,4,4,4}	6	(4,6)
sqc641		P222	16	orthorhombic	{8,6}	3	(2,6)
sqc642		P222	16	orthorhombic	{6,4,4,4}	5	(4,6)
sqc643		P4/mmm	123	tetragonal	{3,10}	5	(2,3)
sqc644		Cmmm	65	orthorhombic	{5,6}	4	(2,5)
sqc645		P4/mmm	123	tetragonal	{4,6}	5	(2,4)
sqc646		P222	16	orthorhombic	{4,6}	5	(2,5)
sqc647		Pmmm	47	orthorhombic	{4,6}	5	(2,5)
sqc648		Pmmm	47	orthorhombic	{4,6}	5	(2,5)
sqc649		Pmmm	47	orthorhombic	{4,6}	5	(2,5)
sqc650		Cmmm	65	orthorhombic	{5,6}	4	(2,5)
sqc651		Pmmm	47	orthorhombic	{5,3}	6	(2,5)
sqc652		Pmmm	47	orthorhombic	{5,6}	4	(2,6)
sqc653		Pmmm	47	orthorhombic	{3,5}	6	(2,5)
sqc654		Cmmm	65	orthorhombic	{4,6}	5	(2,4)
sqc655		P222	16	orthorhombic	{4,3,4,4}	6	(4,6)
sqc656		Pmmm	47	orthorhombic	{4,3,4,4}	6	(4,6)
sqc657		P222	16	orthorhombic	{4,3,4,4}	6	(4,6)
sqc658		Pmmm	47	orthorhombic	{4,3,4,4}	6	(4,6)
sqc659		Pmmm	47	orthorhombic	{3,4,4,4}	6	(4,6)
sqc660		Pmmm	47	orthorhombic	{4,4,4,6}	5	(4,5)
sqc661		P222	16	orthorhombic	{4,4,4,3}	6	(4,6)
sqc662		Pmmm	47	orthorhombic	{4,4,3,4}	6	(4,6)
sqc663		Pmmm	47	orthorhombic	{4,4,4,3}	6	(4,6)
sqc664		P222	16	orthorhombic	{3,4,4,4}	6	(4,6)
sqc665		Cmmm	65	orthorhombic	{4,3,4,4}	6	(4,5)
sqc666		P222	16	orthorhombic	{3,4,4,4}	6	(4,6)
sqc667		Pmmm	47	orthorhombic	{4,3,4,4}	6	(4,6)
sqc668		P222	16	orthorhombic	{4,9}	3	(2,5)
sqc669		P222	16	orthorhombic	{4,6,8,4}	4	(4,5)
sqc670		P222	16	orthorhombic	{8,6}	3	(2,6)
sqc671		P222	16	orthorhombic	{8,3}	4	(2,6)
sqc672		Pmmm	47	orthorhombic	{3,8}	4	(2,6)
sqc673		Fmmm	69	orthorhombic	{3,8}	4	(2,5)
sqc674		P222	16	orthorhombic	{3,8}	4	(2,6)
sqc675		Pmmm	47	orthorhombic	{4,4,6,8}	4	(4,5)
sqc676		Pmmm	47	orthorhombic	{4,6,8,4}	4	(4,5)
sqc677		P222	16	orthorhombic	{5,6}	4	(2,6)
sqc678		Fmmm	69	orthorhombic	{4,7}	4	(2,3)
sqc679		Pmmm	47	orthorhombic	{4,4,6,4,4}	5	(5,6)
sqc680		P222	16	orthorhombic	{4,8,4,3}	5	(4,6)
sqc681		P222	16	orthorhombic	{6,4,4,4}	5	(4,6)
sqc682		P222	16	orthorhombic	{8,3}	4	(2,6)
sqc683		P4/mmm	123	tetragonal	{6,5}	4	(2,4)
sqc684		Pmmm	47	orthorhombic	{6,5}	4	(2,6)
sqc685		P222	16	orthorhombic	{5,6}	4	(2,6)
sqc686		P4/mmm	123	tetragonal	{5,6}	4	(2,3)
sqc687		I4/mmm	139	tetragonal	{5,6}	4	(2,3)
sqc688	xao	I4/mmm	139	tetragonal	{3,5}	6	(2,3)
sqc689		P4/mmm	123	tetragonal	{3,5}	6	(2,3)
sqc690		Cmmm	65	orthorhombic	{3,4,4}	6	(3,4)
sqc691		Cmmm	65	orthorhombic	{3,4,4}	6	(3,4)
sqc692		P222	16	orthorhombic	{6,5}	4	(2,6)
sqc693		Pmmm	47	orthorhombic	{3,5}	6	(2,5)
sqc694		Fmmm	69	orthorhombic	{5,6}	4	(2,3)
sqc695		Pmmm	47	orthorhombic	{6,5}	4	(2,4)
sqc696		Pmmm	47	orthorhombic	{4,6,4,4}	5	(4,6)
sqc697		Pmmm	47	orthorhombic	{4,6,4,4}	5	(4,6)
sqc698		Pmmm	47	orthorhombic	{4,6,4,4}	5	(4,6)
sqc699		Pmmm	47	orthorhombic	{4,4,6,4}	5	(4,6)