Lp compactness criteria with an application to variational convergence of some nonlocal energy functionals

Abstract

Motivated by some variational problems from a nonlocal model of mechanics, this work presents a set of sufficient conditions that guarantee a compact inclusion in the function space of Lp vector fields defined on a domain that is either a bounded domain in Rd or Rd itself. The criteria are nonlocal and are given with respect to nonlocal interaction kernels that may not be necessarily radially symmetric. Moreover, these criteria for vector fields are also different from those given for scalar fields in that the conditions are based on nonlocal interactions involving only parts of the components of the vector fields. The Lp compactness criteria are utilized in demonstrating the convergence of minimizers of parametrized nonlocal energy functionals.