The action of matrix groups on aspherical manifolds
Abstract
Let SLn(Z) (n≥ 3) be the special linear group and Mr be a closed aspherical manifold. It is proved that when r<n, a group action of SLn(Z) on Mr by homeomorphisms is trivial if and only if the induced group homomorphism SLn(% Z)→ Out(π 1(M)) is trivial. For (almost) flat manifolds, we prove a similar result in terms of holonomy groups. Especially, when π 1(M) is nilpotent, the group SLn(% Z) cannot act nontrivially on M when r<n. This confirms a conjecture related to Zimmer's program for these manifolds.
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