Non vanishing of the fourth bounded cohomology of free groups and codimension 2 subspaces

Abstract

In this note we prove that the fouth bounded cohomology of non-abelian free groups with trivial real coefficients is non-zero. In order to prove this, we establish a splitting argument whose simplest form is as follows: Let M denote an n-manifold of non-zero simplicial volume and S a codimension two submanifold of M, then one can conclude that the n-th bounded cohomology of the fundamental group of M S is non-zero. While in this note this approach is only used for degree 4. There is no reason to expect that this approach and its generalizations is not suitable to prove the non-vanishing of higher degrees or the bounded cohomology of different groups as well.

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