Proportion of chiral maps with automorphism group Sn and An
Abstract
Orientably-regular maps are highly symmetric embeddings of graphs in oriented surfaces. Among them, chiral maps are those which fail to be isomorphic to their mirror images. We prove that, as n∞, chirality is generic for orientably-regular maps with automorphism groups Sn or An: the proportion of chiral maps tends to 1 in both families. We also obtain the corresponding asymptotic result for orientably-regular hypermaps with automorphism groups Sn or An. A key ingredient is a sharp asymptotic generation statement: if one chooses an involution of Sn uniformly at random and then chooses an independent uniformly random element of Sn, the probability that these two elements generate Sn and An tends to 34 and 14 as n∞, respectively.
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