Growth rate of endomorphisms of Houghton's groups

Abstract

A Houghton's group Hn consists of translations at infinity of a n rays of discrete points on the plane. In this paper we study the growth rate of endomorphisms of Houghton's groups. We show that if the kernel of an endomorphism φ is not trivial then the growth rate GR(φ) equals either 1 or the spectral radius of the induced map on the abelianization. It turns out that every monomorphism φ of Hn determines a unique natural number such that φ(Hn) is generated by translations with the same translation length . We use this to show that GR(φ) of a monomorphism φ of Hn is precisely for all 2≤ n.