Random triangulations of the d-sphere with minimum volume

Abstract

We study a higher-dimensional analogue of the Random Travelling Salesman Problem: let the complete d-dimensional simplicial complex Knd on n vertices be equipped with i.i.d.\ volumes on its facets, uniformly random in [0,1]. What is the minimum volume Mn,d of a sub-complex homeomorphic to the d-dimensional sphere Sd, containing all vertices? We determine the growth rate of Mn,2, and prove that it is well-concentrated. For d>2 we prove such results to the extent that current knowledge about the number of triangulations of Sd allows. We remark that this can be thought of as a model of random geometry in the spirit of Angel \& Schramm's UIPT, and provide a generalised framework that interpolates between our model and the uniform random triangulation of Sd.