Isoperimetric minimizing movements and AC curves in spaces of measures

Abstract

We define a complete metric structure on the family PLqp(Rn) of probability measures with densities in Lp(Rn) and finite q-moments. We establish the existence of generalized minimizing movements for the isoperimetric ratio and characterize absolutely continuous curves in this space through weak solutions of the continuity equation with velocity fields satisfying a first-order integral condition. We also characterize absolutely continuous curves in the ∞-Wasserstein space and prove a Benamou--Brenier formula for W∞.