Regular maps in the orientable surface of genus 76

NameSchläfliV / F / EmV, mFnotes C&D no.imageswire-
frames
R76.1{3,12}30150 / 600 / 900 1,1 replete singular R76.100
R76.1′{12,3}30600 / 150 / 900 1,1 replete singular R76.1′00
R76.2{3,15}20100 / 500 / 750 1,1 replete singular R76.200
R76.2′{15,3}20500 / 100 / 750 1,1 replete singular R76.2′00
R76.3{3,16}1090 / 480 / 720 2,1 replete R76.300
R76.3′{16,3}10480 / 90 / 720 1,2 replete R76.3′00
R76.4{4,10}20100 / 250 / 500 1,1 replete singular R76.400
R76.4′{10,4}20250 / 100 / 500 1,1 replete singular R76.4′00
R76.5{4,10}20100 / 250 / 500 1,1 replete singular R76.500
R76.5′{10,4}20250 / 100 / 500 1,1 replete singular R76.5′00
R76.10{6,6}30150 / 150 / 450 1,2 replete R76.1000
R76.10′{6,6}30150 / 150 / 450 2,1 replete R76.10′00
R76.9{6,6}30150 / 150 / 450 1,1 replete singular R76.900
R76.9′{6,6}30150 / 150 / 450 1,1 replete singular R76.9′00
R76.6{4,154}3084 / 154 / 308 77,2series m replete R76.6(see series m)0
R76.6′{154,4}308154 / 4 / 308 2,77series l replete R76.6′(see series l)0
R76.7{4,304}3042 / 152 / 304 304,2series h Faces share vertices with themselves R76.7(see series h)0
R76.7′{304,4}304152 / 2 / 304 2,304series j Faces share vertices with themselves R76.7′(see series j)0
R76.11{6,12}2050 / 100 / 300 4,1 replete R76.1100
R76.11′{12,6}20100 / 50 / 300 1,4 replete R76.11′00
R76.12{6,12}2050 / 100 / 300 2,1 replete R76.1200
R76.12′{12,6}20100 / 50 / 300 1,2 replete R76.12′00
R76.8{5,20}630 / 120 / 300 5,1 replete R76.800
R76.8′{20,5}6120 / 30 / 300 1,5 replete R76.8′00
R76.13{6,28}2818 / 84 / 252 7,1 replete R76.1300
R76.13′{28,6}2884 / 18 / 252 1,7 replete R76.13′00
R76.20{10,10}1050 / 50 / 250 1,1 replete singular R76.2000
R76.21{10,10}1050 / 50 / 250 1,2 replete R76.2100
R76.21′{10,10}1050 / 50 / 250 2,1 replete R76.21′00
R76.22{10,10}1050 / 50 / 250 1,1 replete singular R76.2200
R76.14{6,78}786 / 78 / 234 39,1 replete R76.1400
R76.14′{78,6}7878 / 6 / 234 1,39 replete R76.14′00
R76.15{6,78}786 / 78 / 234 26,3 replete R76.1500
R76.15′{78,6}7878 / 6 / 234 3,26 replete R76.15′00
R76.16{6,78}786 / 78 / 234 39,3 replete R76.1600
R76.16′{78,6}7878 / 6 / 234 3,39 replete R76.16′00
R76.17{6,228}762 / 76 / 228 228,3series p Faces share vertices with themselves R76.17(see series p)0
R76.17′{228,6}7676 / 2 / 228 3,228series q Faces share vertices with themselves R76.17′(see series q)0
R76.18{9,18}1025 / 50 / 225 3,3 replete R76.1800
R76.18′{18,9}1050 / 25 / 225 3,3 replete R76.18′00
C76.1{9,24}3618 / 48 / 216 2,3 replete Chiral C76.100
C76.1′{24,9}3648 / 18 / 216 3,2 replete Chiral C76.1′00
R76.19{9,24}3618 / 48 / 216 6,3 replete R76.1900
R76.19′{24,9}3648 / 18 / 216 3,6 replete R76.19′00
R76.23{10,40}4010 / 40 / 200 8,5 replete R76.2300
R76.23′{40,10}4040 / 10 / 200 5,8 replete R76.23′00
R76.24{10,40}4010 / 40 / 200 20,5 replete R76.2400
R76.24′{40,10}4040 / 10 / 200 5,20 replete R76.24′00
R76.25{10,40}4010 / 40 / 200 20,1 replete R76.2500
R76.25′{40,10}4040 / 10 / 200 1,20 replete R76.25′00
R76.26{10,190}382 / 38 / 190 190,5 R76.2600
R76.26′{190,10}3838 / 2 / 190 5,190 R76.26′00
R76.29{20,30}412 / 18 / 180 5,5 replete R76.2900
R76.29′{30,20}418 / 12 / 180 5,5 replete R76.29′00
R76.27{15,60}66 / 24 / 180 15,5 replete R76.2700
R76.27′{60,15}624 / 6 / 180 5,15 replete R76.27′00
R76.28{18,171}382 / 19 / 171 171,9 R76.2800
R76.28′{171,18}3819 / 2 / 171 9,171 R76.28′00
R76.30{24,84}564 / 14 / 168 42,12 replete R76.3000
R76.30′{84,24}5614 / 4 / 168 12,42 replete R76.30′00
R76.31{54,54}66 / 6 / 162 18,27 replete R76.3100
R76.31′{54,54}66 / 6 / 162 27,18 replete R76.31′00
R76.32{78,156}42 / 4 / 156 156,39 R76.3200
R76.32′{156,78}44 / 2 / 156 39,156 R76.32′00
R76.34{154,154}22 / 2 / 154 154,154series k trivial Faces share vertices with themselves R76.34(see series k)0
R76.33{153,306}21 / 2 / 153 306,153series z trivial Faces share vertices with themselves Vertices share edges with themselves R76.33(see series z)0
R76.33′{306,153}22 / 1 / 153 153,306series i trivial Faces share vertices with themselves Faces share edges with themselves R76.33′(see series i)0
R76.35{304,304}21 / 1 / 152 304,304series s trivial Faces share edges with themselves Faces share vertices with themselves Vertices share edges with themselves R76.35(see series s)0

Other Regular Maps

General Index

Orientable
sphere | torus | 2 | 3 | 4 | 5 | 6 |
Non-orientable
projective plane | 4 | 5 | 6 | 7 |