Resumen de Random walks on free products of cyclic groups
Jean Mairesse, Frédéric Mathéus
Let G be a free product of a finite family of finite groups, with the set of generators being formed by the union of the finite groups. We consider a transient nearest-neighbour random walk on G. We give a new proof of the fact that the harmonic measure is a special Markovian measure entirely determined by a finite set of polynomial equations. We show that in several simple cases of interest, the polynomial equations can be explicitly solved to get closed form formulae for the drift. The examples considered are /2 /3, /3 /3, /k /k and the Hecke groups /2 /k. We also use these various examples to study Vershik's notion of extremal generators, which is based on the relation between the drift, the entropy and the growth of the group
