Universal properties of the isotropic Laplace operator on homogeneous trees

Abstract

Let P be the isotropic nearest neighbor transition operator on a homogeneous tree. We consider the λ-eigenfunctions of P for λ outside its 2 spectrum, i.e., the eigenfunctions with eigenvalue γ=λ - 1 of the Laplace operator Delta=P- I, and also the λ-polyharmonic functions, that is, the union of the kernels of (Delta-γ I)n for n≥slant 0. We prove that, on a suitable Banach space generated by the λ-polyharmonic functions, the operator eDelta-γ I is hypercyclic, although Delta-γ I is not.