English

Amenability and harmonic $L^p$-functions on hypergroups

Functional Analysis 2019-06-13 v1

Abstract

Let KK be a locally compact hypergroup with a left invariant Haar measure. We show that the Liouville property and amenability are equivalent for KK when it is second countable. Suppose that σ\sigma is a non-degenerate probability measure on KK, we show that there is no non-trivial σ\sigma-harmonic function which is continuous and vanishing at infinity. Using this, we prove that the space Hσp(K)H_\sigma^p(K) of all σ\sigma-harmonic LpL^p-functions, is trivial for all 1p<1\leq p<\infty. Further, it is shown that Hσ(K)H_\sigma^\infty(K) contains only constant functions if and only if it is a subalgebra of L(K)L^\infty(K). In the case where σ\sigma is adapted and KK is compact, we show that Hσp(K)=C1H_\sigma^p(K)={\mathbb C}1 for all 1p1\leq p\leq\infty.

Keywords

Cite

@article{arxiv.1906.05124,
  title  = {Amenability and harmonic $L^p$-functions on hypergroups},
  author = {Mehdi Nemati and Jila Sohaei},
  journal= {arXiv preprint arXiv:1906.05124},
  year   = {2019}
}
R2 v1 2026-06-23T09:51:32.976Z