Bounded cohomology and scl of verbal wreath products

Abstract

We study the bounded cohomology and the stable commutator length of verbal wreath products WA, where A has trivial bounded cohomology for a sufficiently large class of coefficients.\\ We prove that the stable commutator length always vanishes, and that the bounded cohomology vanishes in positive degrees for some such verbal wreath products; including the standard restricted wreath products (extending a recent result by Monod for lamplighters groups), as well as verbal wreath products arising from n-solvable, n-nilpotent, and k-Burnside (k = 2, 3, 4, 6) verbal products.\ As an application, we show that every group of type Fp isometrically embeds into a group of type Fp with vanishing bounded cohomology in positive degrees for a large class of coefficients.