A Theorem of Roe and Strichartz on homogeneous trees

Abstract

In 1980, J. Roe proved that if \fk\k∈Z is doubly infinite sequence of functions in R which is uniformly bounded and satisfies (dfk/dx)=fk+1 for all k∈Z then f0(x)=a(x+θ) for some a,θ∈R. Later in 1993 Strichartz suitably extended the above result to Rn. In this article we prove a version of their result for homogeneous trees.