English

Stability and Invariant Random Subgroups

Group Theory 2019-09-18 v2

Abstract

Consider Sym(n)\operatorname{Sym}(n), endowed with the normalized Hamming metric dnd_n. A finitely-generated group Γ\Gamma is \emph{P-stable} if every almost homomorphism ρnk ⁣:ΓSym(nk)\rho_{n_k}\colon \Gamma\rightarrow\operatorname{Sym}(n_k) (i.e., for every g,hΓg,h\in\Gamma, limkdnk(ρnk(gh),ρnk(g)ρnk(h))=0\lim_{k\rightarrow\infty}d_{n_k}( \rho_{n_k}(gh),\rho_{n_k}(g)\rho_{n_k}(h))=0) is close to an actual homomorphism φnk ⁣:ΓSym(nk)\varphi_{n_k} \colon\Gamma\rightarrow\operatorname{Sym}(n_k). Glebsky and Rivera observed that finite groups are P-stable, while Arzhantseva and P\u{a}unescu showed the same for abelian groups and raised many questions, especially about P-stability of amenable groups. We develop P-stability in general, and in particular for amenable groups. Our main tool is the theory of invariant random subgroups (IRS), which enables us to give a characterization of P-stability among amenable groups, and to deduce stability and instability of various families of amenable groups.

Keywords

Cite

@article{arxiv.1801.08381,
  title  = {Stability and Invariant Random Subgroups},
  author = {Oren Becker and Alexander Lubotzky and Andreas Thom},
  journal= {arXiv preprint arXiv:1801.08381},
  year   = {2019}
}

Comments

24 pages; v2 includes minor updates and new references

R2 v1 2026-06-22T23:55:57.085Z