Cup Product in Bounded Cohomology of the Free Group

Abstract

The theory of bounded cohomology of groups has many applications. A key open problem is to compute the full bounded cohomology Hbn(F, R) of a non-abelian free group F with trivial real coefficients. It is known that Hbn(F,R) is trivial for n=1 and uncountable dimensional for n=2,3, but remains unknown for any n ≥ 4. For n=4, one may construct classes by taking the cup product α β ∈ Hb4(F, R) between two 2-classes α, β ∈ H2b(F, R). However, we show that all such cup products are trivial if α and β are classes induced by the quasimorphisms defined by Brooks or Rolli.