Regular maps in the orientable surface of genus 6

NameSchläfliV / F / EmV, mFnotes C&D no.imageswire-
frames
S6:{3,10}{3,10}615 / 50 / 75 1,1 replete singular R6.100
S6:{10,3}{10,3}650 / 15 / 75 1,1 replete singular R6.1′00
S6:{4,6}{4,6}1020 / 30 / 60 1,1 replete singular is a polyhedral map permutes its vertices oddly R6.210
S6:{6,4}{6,4}1030 / 20 / 60 1,1 replete singular is a polyhedral map permutes its vertices oddly R6.2′10
S6:{4,9}{4,9}188 / 18 / 36 3,1 replete is not a polyhedral map R6.320
S6:{9,4}{9,4}1818 / 8 / 36 1,3 replete is not a polyhedral map R6.3′10
S6:{4,14}{4,14}284 / 14 / 28 7,2series m replete is not a polyhedral map permutes its vertices oddly R6.42 2
S6:{14,4}{14,4}2814 / 4 / 28 2,7series l replete is not a polyhedral map permutes its vertices oddly R6.4′3 2
S6:{5,10}{5,10}105 / 10 / 25 5,1 replete is not a polyhedral map R6.600
S6:{10,5}{10,5}1010 / 5 / 25 1,5 replete is not a polyhedral map R6.6′00
S6:{6,8}24{6,8}246 / 8 / 24 4,3 replete is not a polyhedral map R6.700
S6:{8,6}24{8,6}248 / 6 / 24 3,4 replete is not a polyhedral map R6.7′00
S6:{6,8}12{6,8}126 / 8 / 24 2,2 replete is not a polyhedral map R6.800
S6:{8,6}12{8,6}128 / 6 / 24 2,2 replete is not a polyhedral map R6.8′00
S6:{4,24}{4,24}242 / 12 / 24 24,2series h Faces share vertices with themselves is not a polyhedral map permutes its vertices oddly R6.53 1
S6:{24,4}{24,4}2412 / 2 / 24 2,24series j Faces share vertices with themselves is not a polyhedral map permutes its vertices oddly R6.5′2 1
S6:{9,9}{9,9}44 / 4 / 18 3,3 replete is not a polyhedral map R6.920
S6:{10,15}{10,15}62 / 3 / 15 15,5 is not a polyhedral map R6.1010
S6:{15,10}{15,10}63 / 2 / 15 5,15 is not a polyhedral map R6.10′10
S6:{14,14}{14,14}22 / 2 / 14 14,14series k Faces share vertices with themselves trivial is not a polyhedral map permutes its vertices oddly R6.123 1
S6:{13,26}{13,26}21 / 2 / 13 26,13series z Faces share vertices with themselves Vertices share edges with themselves trivial is not a polyhedral map permutes its vertices evenly R6.1110
S6:{26,13}{26,13}22 / 1 / 13 13,26series i Faces share vertices with themselves Faces share edges with themselves trivial is not a polyhedral map permutes its vertices oddly R6.11′20
S6:{24,24}{24,24}21 / 1 / 12 24,24series s Faces share vertices with themselves Faces share edges with themselves Vertices share edges with themselves trivial is not a polyhedral map permutes its vertices evenly R6.1320

Other Regular Maps

General Index