A new higher order Yang--Mills--Higgs flow in Riemannian 4-manifold

Abstract

Let (M,g) be a closed Riemannian 4-manifold and let E be a vector bundle over M with structure group G, where G is a compact Lie group. In this paper, we consider a new higher order Yang--Mills--Higgs functional, in which the Higgs field is a section of 0(adE). We show that, under suitable conditions, solutions to the gradient flow do not hit any finite time singularities. In the case that E is a line bundle, we are able to use a different blow up procedure and obtain an improvement of the long time result in Z1. The proof is rather relevant to the properties of the Green function, which is very different from the previous techniques in Ke,Sa,Z1.