Uniform growth rate

Abstract

In an evolutionary system in which the rules of mutation are local in nature, the number of possible outcomes after m mutations is an exponential function of m but with a rate that depends only on the set of rules and not the size of the original object. We apply this principle to find a uniform upper bound for the growth rate of certain groups including the mapping class group. We also find a uniform upper bound for the growth rate of the number of homotopy classes of triangulations of an oriented surface that can be obtained from a given triangulation using m diagonal flips.