Singular cohomology of symplectic quotients by circle actions and Kirwan surjectivity

Abstract

Let M be a symplectic manifold carrying a Hamiltonian S1-action with momentum map J:M → R and consider the corresponding symplectic quotient M0:=J-1(0)/S1. We extend Sjamaar's complex of differential forms on M0, whose cohomology is isomorphic to the singular cohomology H(M0;R) of M0 with real coefficients, to a complex of differential forms on M0 associated with a partial desingularization M0, which we call resolution differential forms. The cohomology of that complex turns out to be isomorphic to the de Rham cohomology H( M0) of M0. Based on this, we derive a long exact sequence involving both H(M0;R) and H( M0) and give conditions for its splitting. We then define a Kirwan map K:HS1(M) → H(M0) from the equivariant cohomology HS1(M) of M to H(M0) and show that its image contains the image of H(M0;R) in H(M0) under the natural inclusion. Combining both results in the case that all fixed point components of M have vanishing odd cohomology we obtain a surjection :HevS1(M) → Hev(M0;R) in even degrees, while already simple examples show that a similar surjection in odd degrees does not exist in general. As an interesting class of examples we study abelian polygon spaces.

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