Strong convergence of random representations of free products of finite groups

Abstract

We extend the polynomial method of Chen--Garza-Vargas--Tropp--van Handel and Magee--Puder--van Handel for operator-norm bounds in random permutation models to the setting where torsion is present. The main new feature is that asymptotic expansion of traces naturally involves fractional powers of N rather than an ordinary Laurent series. We formulate fractional-power analogues of the method's key hypotheses and prove they lead to strong convergence. We verify these analogues for free products of finite groups =G1*·s*Gm. Concretely, for a uniformly random φN∈ hom(, Sym(N)), set πN = std φN, where std denotes the standard (N-1)-dimensional representation of Sym(N) (the permutation representation with the trivial subrepresentation removed). We deduce strong convergence of πN to the left regular representation of . As applications, we obtain asymptotically sharp spectral gaps for the associated random Schreier graphs, including almost Ramanujan behavior for C2*C2*C2 and an explicit non-Ramanujan limiting spectral radius for C2*C3 PSL2( Z).