Regular maps in the orientable surface of genus 29

NameSchläfliV / F / EmV, mFnotes C&D no.imageswire-
frames
R29.1{4,6}8112 / 168 / 336 1,1 replete singular R29.100
R29.1′{6,4}8168 / 112 / 336 1,1 replete singular R29.1′00
C29.1{6,6}2856 / 56 / 168 1,2 replete Chiral C29.100
C29.1′{6,6}2856 / 56 / 168 2,1 replete Chiral C29.1′00
R29.9{6,6}856 / 56 / 168 1,1 replete singular R29.900
R29.7{5,8}2040 / 64 / 160 2,1 replete R29.700
R29.7′{8,5}2064 / 40 / 160 1,2 replete R29.7′00
R29.8{5,8}1040 / 64 / 160 2,1 replete R29.800
R29.8′{8,5}1064 / 40 / 160 1,2 replete R29.8′00
R29.2{4,18}3616 / 72 / 144 3,1 replete R29.200
R29.2′{18,4}3672 / 16 / 144 1,3 replete R29.2′00
R29.3{4,32}328 / 64 / 128 8,1 replete R29.300
R29.3′{32,4}3264 / 8 / 128 1,8 replete R29.3′00
R29.4{4,32}328 / 64 / 128 8,1 replete R29.400
R29.4′{32,4}3264 / 8 / 128 1,8 replete R29.4′00
R29.10{6,10}1024 / 40 / 120 2,2 replete R29.1000
R29.10′{10,6}1040 / 24 / 120 2,2 replete R29.10′00
R29.11{6,10}424 / 40 / 120 2,1 replete R29.1100
R29.11′{10,6}440 / 24 / 120 1,2 replete R29.11′00
R29.12{6,10}824 / 40 / 120 2,1 replete R29.1200
R29.12′{10,6}840 / 24 / 120 1,2 replete R29.12′00
R29.5{4,60}604 / 60 / 120 30,2series m replete R29.5(see series m)0
R29.5′{60,4}6060 / 4 / 120 2,30series l replete R29.5′(see series l)0
R29.6{4,116}582 / 58 / 116 116,2series h Faces share vertices with themselves R29.6(see series h)0
R29.6′{116,4}5858 / 2 / 116 2,116series j Faces share vertices with themselves R29.6′(see series j)0
C29.2{6,15}7014 / 35 / 105 5,1 replete Chiral C29.200
C29.2′{15,6}7035 / 14 / 105 1,5 replete Chiral C29.2′00
R29.16{8,12}1216 / 24 / 96 4,2 replete R29.1600
R29.16′{12,8}1224 / 16 / 96 2,4 replete R29.16′00
R29.17{8,12}1216 / 24 / 96 4,2 replete R29.1700
R29.17′{12,8}1224 / 16 / 96 2,4 replete R29.17′00
R29.18{8,12}1216 / 24 / 96 2,2 replete R29.1800
R29.18′{12,8}1224 / 16 / 96 2,2 replete R29.18′00
R29.19{8,12}616 / 24 / 96 2,2 replete R29.1900
R29.19′{12,8}624 / 16 / 96 2,2 replete R29.19′00
R29.20{8,12}1216 / 24 / 96 2,2 replete R29.2000
R29.20′{12,8}1224 / 16 / 96 2,2 replete R29.20′00
R29.21{8,12}2416 / 24 / 96 2,2 replete R29.2100
R29.21′{12,8}2424 / 16 / 96 2,2 replete R29.21′00
R29.22{8,12}2416 / 24 / 96 3,2 replete R29.2200
R29.22′{12,8}2424 / 16 / 96 2,3 replete R29.22′00
R29.23{8,12}1216 / 24 / 96 3,2 replete R29.2300
R29.23′{12,8}1224 / 16 / 96 2,3 replete R29.23′00
R29.13{6,24}88 / 32 / 96 8,1 replete R29.1300
R29.13′{24,6}832 / 8 / 96 1,8 replete R29.13′00
R29.14{6,24}48 / 32 / 96 8,1 replete R29.1400
R29.14′{24,6}432 / 8 / 96 1,8 replete R29.14′00
R29.15{6,87}582 / 29 / 87 87,3series p Faces share vertices with themselves R29.15(see series p)0
R29.15′{87,6}5829 / 2 / 87 3,87series q Faces share vertices with themselves R29.15′(see series q)0
C29.3{12,12}1414 / 14 / 84 2,4 replete Chiral C29.300
C29.3′{12,12}1414 / 14 / 84 4,2 replete Chiral C29.3′00
R29.24{8,40}204 / 20 / 80 20,4 replete R29.2400
R29.24′{40,8}2020 / 4 / 80 4,20 replete R29.24′00
R29.25{8,40}204 / 20 / 80 20,4 replete R29.2500
R29.25′{40,8}2020 / 4 / 80 4,20 replete R29.25′00
R29.26{18,18}48 / 8 / 72 6,6 replete R29.2600
R29.27{32,32}44 / 4 / 64 16,16 replete R29.2700
R29.28{32,32}84 / 4 / 64 16,16 replete R29.2800
R29.28′{32,32}84 / 4 / 64 16,16 replete R29.28′00
R29.29{32,32}44 / 4 / 64 16,16 replete R29.2900
R29.31{60,60}22 / 2 / 60 60,60series k trivial Faces share vertices with themselves R29.31(see series k)0
R29.30{59,118}21 / 2 / 59 118,59series z trivial Faces share vertices with themselves Vertices share edges with themselves R29.30(see series z)0
R29.30′{118,59}22 / 1 / 59 59,118series i trivial Faces share vertices with themselves Faces share edges with themselves R29.30′(see series i)0
R29.32{116,116}21 / 1 / 58 116,116series s trivial Faces share edges with themselves Faces share vertices with themselves Vertices share edges with themselves R29.32(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 |