On Optimal Stochastic Ballistic Transports

Abstract

For a given Lagrangian L:[0,T]× M× M→ R+ and probability measures μ∈P(M), ∈ P(M), we introduce the stochastic ballistic transportation problems align B(μ,):=∈f\E[ V,X0 +∫0T L(t,X,β(t,X))\,dt] Vμ,XT \\\ B(,μ):=\E[ V,XT -∫0T L(t,X,β(t,X))\,dt] Vμ,X0 \ align where X is a diffusion process with drift β. This cost is based on the stochastic optimal transport problem presented by Mikami and the deterministic ballistic transport introduced by Ghoussoub. We obtain a Kantorovich-style duality result that reformulates this problem in terms of solutions to the Hamilton-Jacobi-Bellman equation equation* ∂φ∂ t+12 φ+H(t,x,∇φ)=0, equation* and show how optimal processes may be thereby attained.