-convergence of polyconvex functionals involving s-fractional gradients to their local counterparts

Abstract

In this paper we study localization properties of the Riesz s-fractional gradient Ds u of a vectorial function u as s 1. The natural space to work with s-fractional gradients is the Bessel space Hs,p for 0 < s < 1 and 1 < p < ∞. This space converges, in a precise sense, to the Sobolev space W1,p when s 1. We prove that the s-fractional gradient Ds u of a function u in W1,p converges strongly to the classical gradient Du. We also show a weak compactness result in W1,p for sequences of functions us with bounded Lp norm of Ds us as s 1. Moreover, the weak convergence of Ds us in Lp implies the weak continuity of its minors, which allows us to prove a semicontinuity result of polyconvex functionals involving s-fractional gradients defined in Hs,p to their local counterparts defined in W1,p. The full -convergence of the functionals is achieved only for the case p>n.