Positive definite functions on semi-homogeneous trees and spherical representations

Abstract

We consider the group Aut(T) of isometries of a semi-homogeneous tree T=Tq+,q- with valencies q+ +1 and q- +1 and its two orbits V+, V- respectively. We make use of the action of Aut (T) to equip the spaces of finitely supported radial functions on each of V with convolution products, hence with a notion of positive definite functions. The 1-functions radial around a root vertex v0∈ V+ form an abelian convolution algebra. We study its multiplicative functionals, called spherical functions, given by eigenfunctions of the nearest-neighbor isotropic transition operator (the Laplace operator on T, and determine which of them are positive definite. Each positive definite function gives rise to a unitary representation of Aut(T); in this way, we produce a series of unitary spherical representations. For q+<q-, the representation whose spherical function has eigenvalue 0 is square-integrable.