Jump detection in Besov spaces via a new BBM formula. Applications to Aviles-Giga type functionals

Abstract

Motivated by the formula, due to Bourgain, Brezis and Mironescu, equation* 0+ ∫∫ |u(x)-u(y)|q|x-y|q\,(x-y)\,dx\,dy=Kq,N\|∇ u\|Lqq\,, equation* that characterizes the functions in Lq that belong to W1,q (for q>1) and BV (for q=1), respectively, we study what happens when one replaces the denominator in the expression above by |x-y|. It turns out that, for q>1 the corresponding functionals "see" only the jumps of the BV function. We further identify the function space relevant to the study of these functionals, the space BVq, as the Besov space B1/qq,∞. We show, among other things, that BVq() contains both the spaces BV() L∞() and W1/q,q(). We also present applications to the study of singular perturbation problems of Aviles-Giga type.