A compact manifold with infinite-dimensional co-invariant cohomology

Abstract

Let M be a smooth manifold. When is a group acting on the manifold M by diffeomorphisms one can define the -co-invariant cohomology of M to be the cohomology of the differential complex c(M)=span\ω-γ*ω,\;ω∈c(M),\;γ∈\. For a Lie algebra G acting on the manifold M, one defines the cohomology of G-divergence forms to be the cohomology of the complex CG(M)=span\LXω,\;ω∈c(M),\;X∈G\. In this short paper we present a situation where these two cohomologies are infinite dimensional.

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