Dead ends on wreath products and lamplighter groups

Abstract

For any finite group A and any finitely generated group B, we prove that the corresponding lamplighter group A B admits a standard generating set with unbounded depth, and that if B is abelian then the above is true for every standard generating set. This generalizes the case where B=Z together with its cyclic generator due to Cleary and Taback. When B=H*K is the free product of two finite groups H and K, we characterize which standard generators of the associated lamplighter group have unbounded depth in terms of a geometrical constant related to the Cayley graphs of H and K. In particular, we find differences with the one-dimensional case: the lamplighter group over the free product of two sufficiently large finite cyclic groups has uniformly bounded depth with respect to some standard generating set.