Boundary Representations of lambda-Harmonic and Polyharmonic Functions on Trees

摘要

On a countable tree T, allowing vertices with infinite degree, we consider an arbitrary stochastic irreducible nearest neighbour transition operator P. We provide a boundary integral representation for general eigenfunctions of P with eigenvalue lambda is an element of C. This is possible whenever lambda is in the resolvent set of P as a self-adjoint operator on a suitable l(2)-space and the diagonal elements of the resolvent ("Green function") do not vanish at lambda. We show that when P is invariant under a transitive (not necessarily fixed-point-free) group action, the latter condition holds for all lambda not equal 0 in the resolvent set. These results extend and complete previous results by Cartier, by Figa-Talamanca and Steger, and by Woess. For those eigenvalues, we also provide an integral representation of lambda-polyharmonic functions of any order n, that is, functions f:T -> C for which (lambda I - P)(n)f = 0. This is a far-reaching extension of work of Cohen et al., who provided such a representation for the simple random walk on a homogeneous tree and eigenvalue lambda = 1. Finally, we explain the (much simpler) analogous results for "forward only" transition operators, sometimes also called martingales on trees.