Braided Thompson groups with and without quasimorphisms

Abstract

We study quasimorphisms and bounded cohomology of a variety of braided versions of Thompson groups. Our first main result is that the Brin--Dehornoy braided Thompson group bV has an infinite-dimensional space of quasimorphisms and thus infinite-dimensional second bounded cohomology. This implies that despite being perfect, bV is not uniformly perfect, in contrast to Thompson's group V. We also prove that relatives of bV like the ribbon braided Thompson group rV and the pure braided Thompson group bF similarly have an infinite-dimensional space of quasimorphisms. Our second main result is that, in stark contrast, the close relative of bV denoted bV, which was introduced concurrently by Brin, has trivial second bounded cohomology. This makes bV the first example of a left-orderable group of type F∞ that is not locally indicable and has trivial second bounded cohomology. This also makes bV an interesting example of a subgroup of the mapping class group of the plane minus a Cantor set that is non-amenable but has trivial second bounded cohomology, behaviour that cannot happen for finite-type mapping class groups.