Partial Regularity of a minimizer of the relaxed energy for biharmonic maps

Abstract

In this paper, we study the relaxed energy for biharmonic maps from a m-dimensional domain into spheres. By an approximation method, we prove the existence of a minimizer of the relaxed energy of the Hessian energy, and that the minimizer is biharmonic and smooth outside a singular set of finite (m-4)-dimensional Hausdorff measure. Moreover, when m=5, we prove that the singular set is 1-rectifiable.