Hamilton-Jacobi-Bellman equations for the optimal control of a state equation with memory

Abstract

This article is devoted to the optimal control of state equations with memory of the form: ?[x(t) = F(x(t),u(t), ∫0+∞ A(s) x(t-s) ds), t>0, with initial conditions x(0)=x, x(-s)=z(s), s>0.]Denoting by yx,z,u the solution of the previous Cauchy problem and: \[v(x,z):=∈fu∈ V \∫0+∞ e-λ s L(yx,z,u(s), u(s))ds \\] where V is a class of admissible controls, we prove that v is the only viscosity solution of an Hamilton-Jacobi-Bellman equation of the form: \[λ v(x,z)+H(x,z,∇x v(x,z))+Dz v(x,z), z >=0\] in the sense of the theory of viscosity solutions in infinite-dimensions of M. Crandall and P.-L. Lions.