English

Co-spectral radius for countable equivalence relations

Probability 2024-05-07 v4 Dynamical Systems Group Theory Operator Algebras

Abstract

We define the co-spectral radius of inclusions SR\mathcal{S}\leq \mathcal{R} of discrete, probability measure-preserving equivalence relations, as the sampling exponent of a generating random walk on the ambient relation. The co-spectral radius is analogous to the spectral radius for random walks on G/HG/H for inclusion HGH\leq G of groups. For the proof, we develop a more general version of the 2-3 method we used in another work on the growth of unimodular random rooted trees. We use this method to show that the walk growth exists for an arbitrary unimodular random rooted graph of bounded degree. We also investigate how the co-spectral radius behaves for hyperfinite relations, and discuss new critical exponents for percolation that can be defined using the co-spectral radius.

Keywords

Cite

@article{arxiv.2205.06692,
  title  = {Co-spectral radius for countable equivalence relations},
  author = {Miklós Abert and Mikolaj Fraczyk and Ben Hayes},
  journal= {arXiv preprint arXiv:2205.06692},
  year   = {2024}
}

Comments

V4 45 pages, No figures. This version is a subset of version 2 which we are splitting into three papers. To appear in Ergodic Theory and Dynamical Systems

R2 v1 2026-06-24T11:16:39.789Z