The distributional hyper-Jacobian determinants in fractional Sobolev spaces

Abstract

In this paper we give a positive answer to a question raised by Baer-Jerison in connection with hyper-Jacobian determinants and associated minors in fractional Sobolev spaces. Inspired by recent works of Brezis-Nguyen and Baer-Jerison on the Jacobian and Hessian determinants, we show that the distributional mth-Jacobian minors of degree r are weak continuous in fractional Sobolev spaces Wm-mr,r, and the result is optimal, satisfying the necessary conditions, in the frame work of fractional Sobolev spaces. In particular, the conditions can be removed in case m=1,2, i.e., the mth-Jacobian minors of degree r are well defined in Ws,p if and only if Ws,p ⊂eq Wm-mr,m in case m=1,2.