Global linearizable actions on topological manifolds

Abstract

Let M be a finite dimensional topological aspherical manifold whose universal cover is Rn. In this paper, we study Aff(M), the subgroup of the group of homeomorphisms of M, whose elements can be lifted to affine transformations of Rn. We show that if M is closed, the connected component Aff(M)0 of Aff(M) acts locally freely on M. We deduce that Aff(M)0 is a solvable Lie group, and is nilpotent if M is a polynomial manifold. We study the foliation defined by the orbits of Aff(M)0 if dim(Aff(M)0)=dim(M)-1.

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