The best approximation of a given function in L2-norm by Lipschitz functions with gradient constraint

Abstract

The starting point of this paper is the study of the asymptotic behavior, as p∞, of the following minimization problem \1p∫|∇ v|p+12∫(v-f)2 \,, \ v∈ W1,p ()\. We show that the limit problem provides the best approximation, in the L2-norm, of the datum f among all Lipschitz functions with Lipschitz constant less or equal than one. Moreover such approximation verifies a suitable PDE in the viscosity sense. After the analysis of the model problem above, we consider the asymptotic behavior of a related family of nonvariational equations and, finally, we also deal with some functionals involving the (N-1)-Hausdorff measure of the jump set of the function.