Dilatation of outer automorphisms of Right-angled Artin Groups

Abstract

We study the dilatation of outer automorphisms of right-angled Artin groups. Given a right-angled Artin group defined on a simplicial graph: A() = V | E and an automorphism φ ∈ Out(A()) there is a natural measure of how fast the length of a word of A() grows after n iterations of φ as a function of n, which we call the dilatation of w under φ. We define the dilatation of φ as the supremum over dilatations of all w ∈ A(). Assuming that φ is a pure and square map, we show that if the dilatation of φ is positive, then either there exists a free abelian special subgroup on which that dilatation is realized; or there exists a strata of either free or free abelian groups on which the dilatation is realized.