Estimates of the best Sobolev constant of the embedding of BV() into L1(∂) and related shape optimization problems

Abstract

In this paper we find estimates for the optimal constant in the critical Sobolev trace inequality λ1()\|u\|L1(∂) \|u\|W1,1() that are independent of . This estimates generalize those of BS concerning the p-Laplacian to the case p=1. We apply our results to prove existence of an extremal for this embedding. We then study an optimal design problem related to λ1, and eventually compute the shape derivative of the functional λ1(). As a consequence, we obtain that a ball of n of radius n is critical for volume-preserving deformations.