Genus dependence of the number of (non-)orientable surface triangulations

Abstract

Topological triangulations of orientable and non-orientable surfaces with arbitrary genus have important applications in quantum geometry, graph theory and statistical physics. However, until now only the asymptotics for 2-spheres are known analytically, and exact counts of triangulations are only available for both small genus and small triangulations. We apply the Wang-Landau algorithm to calculate the number N(m,h) of triangulations for several order of magnitudes in system size m and genus h. We verify that the limit of the entropy density of triangulations is independent of genus and orientability and are able to determine the next-to-leading and the next-to-next-to-leading order terms. We conjecture for the number of surface triangulations the asymptotic behavior equation* N(m,h) → (170.4 15.1)h m-2(h - 1)/5 ( 25627 )m / 2\;, equation* what might guide a mathematicians proof for the exact asymptotics.