Minimizers of higher order gauge invariant functionals

Abstract

We introduce higher order variants of the Yang-Mills functional that involve (n-2)th order derivatives of the curvature. We prove coercivity and smoothness of critical points in Uhlenbeck gauge in dimensions dimM 2n. These results are then used to establish the existence of smooth minimizers on a given principal bundle P M for subcritical dimensions dimM<2n. In the case of critical dimension dimM=2n we construct a minimizer on a bundle which might differ from the prescribed one, but has the same Chern classes c1,…,cn-1. A key result is a removable singularity theorem for bundles carrying a Wn-1,2-connection. This generalizes a recent result by Petrache and Rivi\`ere.