Infinitesimal isometries of connection metric and generalized moment map equation

Abstract

Let (M,g) be a smooth Riemannian manifold, K a compact Lie group and p:P M a principal K-bundle over M endowed with a connection A. Fixing a bi invariant inner product on Lie algebra k of K, the connection A and metric g define a Riemannian metric gA on P. Let X be the horizontal lift of vector field X on M and, let be the vertical field associated with section ∈ A0(ad( P)) of the adjoint bundle. It is proved that the connection A is invariant under the 1-parameter group of local diffeomorphism generated by X+ if and only if X and satisfy the generalized moment map equation XFA=-∇A. The Lie algebra of fiber preserving Killing fields of (P,gA) is studied, in the case where K is compact, connected and semisimple.