English

Polynomials and harmonic functions on discrete groups

Group Theory 2018-05-10 v3 Metric Geometry Probability

Abstract

Alexopoulos proved that on a finitely generated virtually nilpotent group, the restriction of a harmonic function of polynomial growth to a torsion-free nilpotent subgroup of finite index is always a polynomial in the Mal'cev coordinates of that subgroup. For general groups, vanishing of higher-order discrete derivatives gives a natural notion of polynomial maps, which has been considered by Leibman and others. We provide a simple proof of Alexopoulos's result using this notion of polynomials, under the weaker hypothesis that the space of harmonic functions of polynomial growth of degree at most k is finite dimensional. We also prove that for a finitely generated group the Laplacian maps the polynomials of degree k surjectively onto the polynomials of degree k - 2. We then present some corollaries. In particular, we calculate precisely the dimension of the space of harmonic functions of polynomial growth of degree at most k on a virtually nilpotent group, extending an old result of Heilbronn for the abelian case, and refining a more recent result of Hua and Jost.

Keywords

Cite

@article{arxiv.1505.01175,
  title  = {Polynomials and harmonic functions on discrete groups},
  author = {Tom Meyerovitch and Idan Perl and Matthew Tointon and Ariel Yadin},
  journal= {arXiv preprint arXiv:1505.01175},
  year   = {2018}
}

Comments

24 pages

R2 v1 2026-06-22T09:28:43.649Z