On the dynamics of a rational semigroup on a convolution measure algebra

Abstract

We are going to study the dynamical properties of the rational semigroup Qt(μ) where Qt(μ)= (1-t) μ * (1- t μ)-1, for t ∈ [0,1), that is defined for μ ∈ P(G), the set of Borel probabilities over (G, ·) an abelian compact topological group where we define the convolution, * μ ∈ P(G), as usual for a group ∫ f d( * μ)= ∫ ∫ f(xy) d(x) dμ(y), then (P(G), *) became a convolution measure algebra (CM-algebra). We investigate several properties for this semigroup (as the Stable Manifold Theorem, Asymptotic behavior, invariant sets, differential properties, stationary points, etc) and how they are related with the Choquet-Deny equation. As an application we give a complete description of this semigroup for finite abelian groups.