Morse theory for the space of Higgs G-bundles

Abstract

Fix a C∞ principal G--bundle E0G on a compact connected Riemann surface X, where G is a connected complex reductive linear algebraic group. We consider the gradient flow of the Yang--Mills--Higgs functional on the cotangent bundle of the space of all smooth connections on E0G. We prove that this flow preserves the subset of Higgs G--bundles, and, furthermore, the flow emanating from any point of this subset has a limit. Given a Higgs G--bundle, we identify the limit point of the integral curve passing through it. These generalize the results of the second named author on Higgs vector bundles.