Self-similarity and spectral dynamics

Abstract

For a tuple A= (A0, A1, … , An) of elements in a unital Banach algebra B, its projective (joint) spectrum p(A) is the collection of z∈Pn such that A(z)=z0A0+z1 A1 + … zn An is not invertible. If the tuple A is associated with the generators of a finitely generated group, then p(A) is simply called the projective spectrum of the group. This paper investigates a connection between self-similar group representations and an induced polynomial map on the projective space that preserves the projective spectrum of the group. The focus is on two groups: the infinite dihedral group D∞ and the Grigorchuk group G of intermediate growth. The main theorem shows that for D∞ the Julia set of the induced rational map F is equal to the union of the projective spectrum with the extended indeterminacy set. Moreover, the limit function of the iteration sequence \F n\ on the Fatou set is determined explicitly. The result has an application to the group G and gives rise to a conjecture about its associated Julia set.