Estimates for the Poisson kernel and the evolution kernel on nilpotent meta-abelian groups

Abstract

Let S be a semi direct product S=N A where N is a connected and simply connected, non-abelian, nilpotent meta-abelian Lie group and A is isomorphic with k, k>1. We consider a class of second order left-invariant differential operators on S of the form Lα=La+α, where α∈k, and for each a∈k, La is left-invariant second order differential operator on N and α=-<α,∇>, where is the usual Laplacian on k. Using some probabilistic techniques (e.g., skew-product formulas for diffusions on S and N respectively) we obtain an upper bound for the Poisson kernel for Lα. We also give an upper estimate for the transition probabilities of the evolution on N generated by Lσ(t), where σ is a continuous function from [0,∞) to k.