Moduli spaces of framed G--Higgs bundles and symplectic geometry

Abstract

Let X be a compact connected Riemann surface, D\, ⊂\, X a reduced effective divisor, G a connected complex reductive affine algebraic group and Hx\, ⊂neq\, Gx a Zariski closed subgroup for every x\, ∈\, D. A framed principal G--bundle is a pair (EG,\, φ), where EG is a holomorphic principal G--bundle on X and φ assigns to each x\, ∈\, D a point of the quotient space (EG)x/Hx. A framed G--Higgs bundle is a framed principal G--bundle (EG,\, φ) together with a section θ\, ∈\, H0(X,\, ad(EG) KX OX(D)) such that θ(x) is compatible with the framing φ for every x\, ∈\, D. We construct a holomorphic symplectic structure on the moduli space MFH(G) of stable framed G--Higgs bundles. Moreover, we prove that the natural morphism from MFH(G) to the moduli space MH(G) of D-twisted G--Higgs bundles (EG,\, θ) that forgets the framing, is Poisson. These results generalize BLP where (G,\, \Hx\x∈ D) is taken to be (GL(r, C),\, \Ir× r\x∈ D). We also investigate the Hitchin system for MFH(G) and its relationship with that for MH(G).