W*-superrigidity for arbitrary actions of central quotients of braid groups

Abstract

For any n≥slant 4 let Bn=Bn/Z(Bn) be the quotient of the braid group Bn through its center. We prove that any free ergodic probability measure preserving (pmp) action Bn (X,μ) is W*-superrigid in the following sense: if L∞(X) Bn L∞(Y), for an arbitrary free ergodic pmp action (Y,), then the actions Bn X, Y are stably (or, virtually) conjugate. Moreover, we prove that the same holds if Bn is replaced with a finite index subgroup of the direct product Bn1×·s× Bnk, for some n1,…,nk≥slant 4. The proof uses the dichotomy theorem for normalizers inside crossed products by free groups from PV11 in combination with the OE superrigidity theorem for actions of mapping class groups from Ki06.