Regular maps in the orientable surface of genus 7

NameSchläfliV / F / EmV, mFnotes C&D no.imageswire-
frames
S7:{3,7}{3,7}1872 / 168 / 252 1,1 replete singular R7.100
S7:{7,3}{7,3}18168 / 72 / 252 1,1 replete singular R7.1′00
S7:{3,12}{3,12}2412 / 48 / 72 2,1 replete R7.200
S7:{12,3}{12,3}2448 / 12 / 72 1,2 replete R7.2′00
S7:{4,16|4}{4,16}164 / 16 / 32 8,1series mt replete is not a polyhedral map R7.300
S7:{16,4|4}{16,4}1616 / 4 / 32 1,8series lt replete is not a polyhedral map R7.3′00
S7:{4,16|2}{4,16}164 / 16 / 32 8,2series m replete is not a polyhedral map R7.4(see series m) 2
S7:{16,4|2}{16,4}1616 / 4 / 32 2,8series l replete is not a polyhedral map R7.4′1 2
C7.2{7,7}48 / 8 / 28 1,1 replete Chiral singular is not a polyhedral map C7.210
C7.2′{7,7}48 / 8 / 28 1,1 replete Chiral singular is not a polyhedral map C7.2′10
S7:{4,28}{4,28}142 / 14 / 28 28,2series h Faces share vertices with themselves is not a polyhedral map R7.510
S7:{28,4}{28,4}1414 / 2 / 28 2,28series j Faces share vertices with themselves is not a polyhedral map R7.5′(see series j)0
S7:{6,9}ch{6,9}186 / 9 / 27 3,1 replete Chiral is not a polyhedral map permutes its vertices oddly C7.110
S7:{9,6}ch{9,6}189 / 6 / 27 1,3 replete Chiral is not a polyhedral map permutes its vertices oddly C7.1′00
S7:{6,9}{6,9}186 / 9 / 27 3,3 replete is not a polyhedral map R7.600
S7:{9,6}{9,6}189 / 6 / 27 3,3 replete is not a polyhedral map R7.6′00
S7:{6,12}{6,12}84 / 8 / 24 4,2 replete is not a polyhedral map R7.700
S7:{12,6}{12,6}88 / 4 / 24 2,4 replete is not a polyhedral map R7.7′00
S7:{6,21}{6,21}142 / 7 / 21 21,3series p Faces share vertices with themselves is not a polyhedral map R7.820
S7:{21,6}{21,6}147 / 2 / 21 3,21series q Faces share vertices with themselves is not a polyhedral map R7.8′10
S7:{16,16}2{16,16}22 / 2 / 16 16,16series k trivial is not a polyhedral map R7.101 1
S7:{16,16}4{16,16}42 / 2 / 16 16,16series kt is not a polyhedral map R7.1110
S7:{15,30}{15,30}21 / 2 / 15 30,15series z trivial Faces share vertices with themselves Vertices share edges with themselves is not a polyhedral map R7.9(see series z)0
S7:{30,15}{30,15}22 / 1 / 15 15,30series i trivial Faces share vertices with themselves Faces share edges with themselves is not a polyhedral map R7.9′10
S7:{28,28}{28,28}21 / 1 / 14 28,28series s trivial Faces share edges with themselves Faces share vertices with themselves Vertices share edges with themselves is not a polyhedral map R7.12(see series s)0

Other Regular Maps

General Index