English

Polyharmonic functions for finite graphs and Markov chains

Probability 2022-06-10 v1

Abstract

On a finite graph with a chosen partition of the vertex set into interior and boundary vertices, a λ\lambda-polyharmonic function is a complex function ff on the vertex set which satisfies (λIP)nf(x)=0(\lambda \cdot I - P)^n f(x) = 0 at each interior vertex. Here, PP may be the normalised adjaceny matrix, but more generally, we consider the transition matrix PP of an arbitrary Markov chain to which the (oriented) graph structure is adapted. After describing these `global' polyharmonic functions, we turn to solving the Riquier problem, where nn boundary functions are preassigned and a corresponding `tower' of nn successive Dirichlet type problems are solved. The resulting unique solution will be polyharmonic only at those points which have distance at least nn from the boundary. Finally, we compare these results with those concerning infinite trees with the end boundary, as studied by Cohen, Colonnna, Gowrisankaran and Singman, and more recently, by Picardello and Woess.

Keywords

Cite

@article{arxiv.1901.08376,
  title  = {Polyharmonic functions for finite graphs and Markov chains},
  author = {Thomas Hirschler and Wolfgang Woess},
  journal= {arXiv preprint arXiv:1901.08376},
  year   = {2022}
}
R2 v1 2026-06-23T07:21:00.094Z