Optimal Transportation for Generalized Lagrangian

Abstract

In this paper, we study the optimal transportation for generalized Lagrangian L=L(x, u,t), and consider the cost function as following: c(x, y)=∈fx(0)=x\(1)=y\∈U∫01L(x(s), u(x(s),s), s)ds. Where U is a control set, and x satisfies the following ordinary equation: x(s)=f(x(s),u(x(s),s)). We prove that under the condition that the initial measure μ0 is absolutely continuous w.r.t. the Lebesgue measure, the Monge problem has a solution, and the optimal transport map just walks along the characteristic curves of the corresponding Hamilton-Jacobi equation: equation* cases Vt(t, x)+u∈U<Vx(t, x), f(x, u(x(t), t),t)-L(x(t), u(x(t), t),t)>=0.\\ V(0,x)=φ0(x) cases equation*