On the Kirwan map for moduli of Higgs bundles

Abstract

Let C be a smooth complex projective curve and G a connected complex reductive group. We prove that if the center Z(G) of G is disconnected, then the Kirwan map H*(Bun(G,C),Q)→ H*(MHiggsss,Q) from the cohomology of the moduli stack of G-bundles to the moduli stack of semistable G-Higgs bundles, fails to be surjective: more precisely, the "variant cohomology" (and variant intersection cohomology) of the stack MHiggsss of semistable G-Higgs bundles, is always nontrivial. We also show that the image of the pullback map H*(MHiggsss,Q)→ H*(MHiggsss,Q), from the cohomology of the moduli space of semistable G-Higgs bundles to the stack of semistable G-Higgs bundles, cannot be contained in the image of the Kirwan map. The proof uses a Borel-Quillen--style localization result for equivariant cohomology of stacks to reduce to an explicit construction and calculation.