English

Equivariant dissipation in non-archimedean groups

Metric Geometry 2020-01-22 v3 General Topology Group Theory

Abstract

We prove that, if a topological group GG has an open subgroup of infinite index, then every net of tight Borel probability measures on GG UEB-converging to invariance dissipates in GG in the sense of Gromov. In particular, this solves a 2006 problem by Pestov: for every left-invariant (or right-invariant) metric dd on the infinite symmetric group Sym(N)\mathrm{Sym}(\mathbb{N}), compatible with the topology of pointwise convergence, the sequence of the finite symmetric groups (Sym(n),d ⁣ ⁣Sym(n),μSym(n))nN\left(\mathrm{Sym}(n),d\!\!\upharpoonright_{\mathrm{Sym}(n)},\mu_{\mathrm{Sym}(n)}\right)_{n \in \mathbb{N}} equipped with the restricted metrics and their normalized counting measures dissipates, thus fails to admit a subsequence being Cauchy with respect to Gromov's observable distance.

Keywords

Cite

@article{arxiv.1804.08511,
  title  = {Equivariant dissipation in non-archimedean groups},
  author = {Friedrich Martin Schneider},
  journal= {arXiv preprint arXiv:1804.08511},
  year   = {2020}
}

Comments

10 pages, no figures; v2: main results generalized, 16 pages; v3 (taking referee report into account): proof of Theorem 5.1 simplified, Remark 5.11 added, typos corrected, 17 pages, final version to appear in the Israel Journal of Mathematics

R2 v1 2026-06-23T01:32:42.633Z