U-tiling: UQC4630
h-net
1 record listed.
Image |
h-net name |
Orbifold symbol |
Transitivity (Vert,Edge,Face) |
Vertex Degree |
2D Vertex Symbol |
![Net details](/hnet_small_images/hqc1494.jpg) |
hqc1494 |
*22222 |
(4,5,2) |
{4,4,3,3} |
{8.8.8.8}{8.8.8.8}{8.4.8}{8.8.4} |
s-nets
3 records listed.
Surface |
Edge collapse |
Image |
s-net name |
Other names |
Space group |
Space group number |
Symmetry class |
Vertex degree(s) |
Vertices per primitive unit cell |
Transitivity (Vertex, Edge) |
P
|
False
|
|
sqc3829
|
|
Fmmm |
69 |
orthorhombic |
{3,4,3,4} |
12 |
(4,5) |
G
|
False
|
|
sqc9854
|
|
Fddd |
70 |
orthorhombic |
{4,4,3,3} |
24 |
(4,6) |
D
|
False
|
|
sqc458
|
|
Pmmm |
47 |
orthorhombic |
{4,4,3,3} |
6 |
(4,5) |
Topological data
Vertex degrees | {4,4,3,3} |
2D vertex symbol | {8.8.8.8}{8.8.8.8}{8.4.8}{8.8.4} |
Dual tiling | ![Tiling details](/u_net_small_images/s22222b_FSGG_59_3_1.png) |
D-symbol
Genus-3 version with t-tau cuts labelled
<59.3:160:81 3 5 7 9 90 101 13 15 17 19 110 121 23 25 27 29 130 141 33 35 37 39 150 111 43 45 47 49 120 91 53 55 57 59 100 151 63 65 67 69 160 131 73 75 77 79 140 83 85 87 89 93 95 97 99 103 105 107 109 113 115 117 119 123 125 127 129 133 135 137 139 143 145 147 149 153 155 157 159,2 4 6 10 28 99 12 14 16 20 38 119 22 24 26 30 139 32 34 36 40 159 42 44 46 50 68 109 52 54 56 60 78 89 62 64 66 70 149 72 74 76 80 129 82 84 86 90 128 92 94 96 100 138 102 104 106 110 148 112 114 116 120 158 122 124 126 130 132 134 136 140 142 144 146 150 152 154 156 160,41 12 13 24 25 8 9 100 51 34 35 18 19 120 61 32 33 28 29 140 71 38 39 160 52 53 64 65 48 49 110 74 75 58 59 90 72 73 68 69 150 78 79 130 111 102 103 124 125 88 89 101 112 113 134 135 98 99 144 145 108 109 154 155 118 119 151 142 143 128 129 141 152 153 138 139 148 149 158 159:8 4 8 4 8 8 8 4 8 4 8 8,4 4 3 3 3 3 4 3 3 4 3 3 3 3 3 3 4 4 3 4 3 3 3 4> {(2, 60): 't1', (1, 127): 't3^-1', (2, 59): 't3^-1', (1, 117): 't2^-1', (2, 49): 't2^-1', (1, 118): 't2^-1', (1, 107): 't2', (1, 97): 't3^-1', (1, 98): 't3^-1', (0, 39): 'tau3', (1, 88): 't3', (2, 30): 't1^-1', (0, 30): 'tau3', (0, 60): 'tau3^-1', (2, 154): 't2', (0, 29): 'tau2^-1', (2, 150): 'tau3*t1*tau2^-1', (2, 151): 't2*tau1*t3^-1', (2, 144): 't2^-1', (0, 20): 'tau2^-1', (2, 19): 't2', (2, 140): 'tau3^-1*t1^-1*tau2', (2, 141): 't2^-1*tau1^-1*t3', (2, 142): 't2^-1*tau1^-1*t3', (2, 143): 't2^-1', (2, 9): 't3', (0, 130): 'tau2^-1', (2, 133): 't3', (2, 134): 't3', (2, 124): 't3^-1', (2, 123): 't3^-1', (1, 48): 't2^-1', (2, 112): 'tau1', (2, 113): 't2^-1', (2, 132): 't3*tau1^-1*t2^-1', (2, 111): 'tau1', (2, 101): 'tau1^-1', (2, 102): 'tau1^-1', (0, 159): 'tau3', (0, 79): 'tau2'}