Multivalued Stochastic Delay Differential Equations and Related Stochastic Control Problems

Abstract

We study the existence and uniqueness of a solution for the multivalued stochastic differential equation with delay (the multivalued term is of subdifferential type): \[ \array [c]r dX(t)+∂(X(t)) dt b(t,X(t),Y(t),Z(t)) dt+σ(t,X(t),Y(t),Z(t))dW(t), \\ t∈(s,T],\\ μlticolumn1lX(t)=(t-s) ,\;t∈[ s-δ,s] . array . \] Specify that in this case the coefficients at time t depends also on previous values of X(t) through Y(t) and Z(t). Also X is constrained with the help of a bounded variation feedback law K to stay in the convex set Dom(). Afterwards we consider optimal control problems where the state X is a solution of a controlled delay stochastic system as above. We establish the dynamic programming principle for the value function and finally we prove that the value function is a viscosity solution for a suitable Hamilton-Jacobi-Bellman type equation.