Smooth and analytic actions of SL(n, R) and SL(n, Z) on closed n-dimensional manifolds
Abstract
The main result is a classification of smooth actions of SL(n, R), n ≥ 3, or connected groups locally isomorphic to it, on closed n-manifolds, extending a theorem of Uchida. We construct new exotic actions of SL(n, Z) on the n-torus and connected sums of n-tori, and we formulate a conjectural classification of actions of lattices in SL(n, R) on closed n-manifolds. We prove some results about invariant rigid geometric structures for SL(n, R)-actions.
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