Uniform estimates for a Modica-Mortola type approximation of branched transportation

Abstract

Models for branched networks are often expressed as the minimization of an energy Mα over vector measures concentrated on 1-dimensional rectifiable sets with a divergence constraint. We study a Modica-Mortola type approximation Mα, introduced by Edouard Oudet and Filippo Santambrogio, which is defined over H1 vector measures. These energies induce some pseudo-distances between L2 functions obtained through the minimization problem \Mα (u)\;:\;∇· u=f+-f-\. We prove some uniform estimates on these pseudo-distances which allow us to establish a -convergence result for these energies with a divergence constraint.