Exponential growth rates of free and amalgamated products

Abstract

We prove that there is a gap between 2 and (1+5)/2 for the exponential growth rate of free products G=A*B not isomorphic to the infinite dihedral group. For amalgamated products G=A*C B with ([A:C]-1)([B:C]-1)≥2, we show that lower exponential growth rate than 2 can be achieved by proving that the exponential growth rate of the amalgamated product PGL(2,Z) (C2× C2) *C2 D6 is equal to the unique positive root of the polynomial z3-z-1. This answers two questions by Avinoam Mann [The growth of free products, Journal of Algebra 326, no. 1 (2011) 208--217].