Transport Energy

Abstract

We introduce the transport energy functional E (a variant of the Bouchitt\'e-Buttazzo-Seppecher shape optimization functional) and we prove that its unique minimizer is the optimal transport density μ*, i.e., the solution of Monge-Kantorovich equations. We study the gradient flow of E showing that μ* is the unique global attractor of the flow. We introduce a two parameter family \ Eλ,δ\λ,δ>0 of strictly convex functionals approximating E and we prove the convergence of the minimizers μλ,δ* of Eλ,δ to μ* as we let δ 0+ and λ 0+. We derive an evolution system of fully non-linear PDEs as gradient flow of Eλ,δ in L2, showing existence and uniqueness of solutions. All the trajectories of the flow converge in W1,p0 to the unique minimizer μλ,δ* of Eλ,δ. Finally, we characterize μλ,δ* by a non-linear system of PDEs which is a perturbation of Monge-Kantorovich equations by means of a p-Laplacian.