On periodic p-harmonic functions on Cayley tree

Abstract

We show that any periodic with respect to normal subgroups (of the group representation of the Cayley tree) of finite index p-harmonic function is a constant. For some normal subgroups of infinite index we describe a class of (non-constant) periodic p-harmonic functions. If p≠2, the p-harmonicity is non-linear, i.e., the linear combination of p-harmonic functions need not be p-harmonic. In spite of this, we show that linear combinations of the p-harmonic functions described for normal subgroups of infinite index are also p-harmonic.