Stability and Invariant Random Subgroups

Abstract

Consider Sym(n), endowed with the normalized Hamming metric dn. A finitely-generated group is P-stable if every almost homomorphism nk →Sym(nk) (i.e., for every g,h∈, k→∞dnk( nk(gh),nk(g)nk(h))=0) is close to an actual homomorphism nk →Sym(nk). Glebsky and Rivera observed that finite groups are P-stable, while Arzhantseva and Paunescu 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.