Summability estimates on transport densities with dirichlet regions on the boundary via symmetrization techniques

Abstract

In this paper we consider the mass transportation problem in a bounded domain where a positive mass f + in the interior is sent to the boundary ∂, appearing for instance in some shape optimization problems, and we prove summability estimates on the associated transport density σ, which is the transport density from a diffuse measure to a measure on the boundary f -- = P \# f + (P being the projection on the boundary), hence singular. Via a symmetrization trick, as soon as is convex or satisfies a uniform exterior ball condition, we prove L p estimates (if f + ∈ L p, then σ ∈ L p). Finally, by a counterexample we prove that if f + ∈ L ∞ () and f -- has bounded density w.r.t. the surface measure on ∂, the transport density σ between f + and f -- is not necessarily in L ∞ (), which means that the fact that f -- = P \# f + is crucial.