The Hilbert--Smith conjecture for three-manifolds

Abstract

We show that every locally compact group which acts faithfully on a connected three-manifold is a Lie group. By known reductions, it suffices to show that there is no faithful action of Zp (the p-adic integers) on a connected three-manifold. If Zp acts faithfully on M3, we find an interesting Zp-invariant open set U⊂eq M with H2(U)= Z and analyze the incompressible surfaces in U representing a generator of H2(U). It turns out that there must be one such incompressible surface, say F, whose isotopy class is fixed by Zp. An analysis of the resulting homomorphism ZpMCG(F) gives the desired contradiction. The approach is local on M.