On the Uniqueness for One-Dimensional Constrained Hamilton-Jacobi Equations

Abstract

The goal of this paper is to study uniqueness of a one-dimensional Hamilton-Jacobi equation equation* cases ut=|ux|2+R(x,I(t)) &in R × (0,∞), R u(·,t)=0 &on [0,∞), cases equation* with an initial condition u0(x,0)=u0(x) on R. A reaction term R(x,I(t)) is given while I(t) is an unknown constraint (Lagrange multiplier) that forces maximum of u to be always zero. In the paper, we prove uniqueness of a pair of unknowns (u,I) using dynamic programming principle in one dimensional space for some particular class of nonseparable reaction R(x,I(t)).