Optimal Ballistic Transport and Hopf-Lax Formulae on Wasserstein Space

Abstract

We investigate the optimal mass transport problem associated to the following "ballistic" cost functional on phase space M× M*, bT(v, x):=∈f\ v, γ (0) +∫0TL(γ (t), γ(t))\, dt, γ ∈ C1([0, T), M), γ(T)=x\, where M=Rd, T>0, and L:M× M R is a Lagrangian that is jointly convex in both variables. Under suitable conditions on the initial and final probability measures, we use convex duality \`a la Bolza and Monge-Kantorovich theory to lift classical Hopf-Lax formulae from state space to Wasserstein space. This allows us to relate optimal transport maps for the ballistic cost to those associated with the fixed-end cost defined on M× M by cT(x,y):=∈f\∫0TL(γ(t), γ(t))\, dt, γ∈ C1([0, T), M), γ(0)=x, γ(T)=y\. We also point to links with the theory of mean field games.