A singular radial connection over B5 minimizing the Yang-Mills energy

Abstract

We prove that the pullback of the SU(n)-soliton of Chern class c2=1 over S4 via the radial projection π: B5\0\ S4 minimizes the Yang-Mills energy under the fixed boundary trace constraint. In particular this shows that stationary Yang-Mills connections in high dimension can have singular sets of codimension 5.