On fixed points and stabilizers in solvable Baumslag--Solitar groups

Abstract

In this article, we study the fixed-point subgroups of the solvable Baumslag-Solitar groups (1,n)= a, t t a t-1 = an , n>1 of automorphisms and endomorphisms. We also investigate the stabilizers of subgroups of (1,n), considered as subgroups of the group of automorphisms and submonoids of the monoid of endomorphisms of (1,n). We show that the fixed-point subgroups of automorphisms are either infinite cyclic (in which case, a generator is computable), or they are equal to Z[1n], an infinitely generated abelian group. We further prove that the stabilizer subgroup of an element in (1,n) is either a finitely generated abelian group whose rank equals the number of distinct prime divisors of n (and in this case, a finite generating set is computable), or it is Z[1n]. As a corollary, we show that for all k ∈ N, every element of (1,n) has a unique k-th root. We then proceed to examine the behaviour of fixed-point subgroups and stabilizers under endomorphisms and find similar results. We prove that the fixed point subgroups of endomorphisms are again infinite cyclic or Z[1n], but the stabilizer submonoids are always infinitely generated.