A characterization of higher rank symmetric spaces via bounded cohomology
Abstract
Let M be complete nonpositively curved Riemannian manifold of finite volume whose fundamental group does not contain a finite index subgroup which is a product of infinite groups. We show that the universal cover M is a higher rank symmetric space iff H2b(M;) H2(M;) is injective (and otherwise the kernel is infinite-dimensional). This is the converse of a theorem of Burger-Monod. The proof uses the celebrated Rank Rigidity Theorem, as well as a new construction of quasi-homomorphisms on groups that act on CAT(0) spaces and contain rank 1 elements.
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