Applications of the Liouville symplectic form on the cotangent bundle of a loop group

Abstract

Let G be a semisimple, simply connected, affine algebraic group defined over C. Consider the Liouville symplectic structure on the total space T*G((t)) of the cotangent bundle of the loop group G((t)), where t is a formal parameter. We show that the Liouville symplectic structure on T*G((t)) induces the symplectic structures on the moduli stack of framed principal Higgs G-bundles on a compact connected Riemann surface X and also on the moduli spaces of framed G-connections on X. Similar symplectic structures -- on the moduli stack of framed principal Higgs G-bundles, with finite order framing, and also framed connections on X, with finite order framing -- were constructed earlier by various authors. Our results show that they all have a common origin.