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. In this manuscript we consider a class of optimal control problems of stochastic differential delay equations. First, we rewrite the problem in a suitable infinite-dimensional Hilbert space. Then, using the dynamic programming approach, we characterize the value function of the problem as the unique viscosity solution of the associated infinite-dimensional Hamilton-Jacobi-Bellman equation. Finally, we prove a \ (C^1, \) -partial regularity of the value function. We apply these results to path dependent financial and economic problems (Merton-like portfolio problem and optimal advertising). Keywordsstochastic optimal controlviscosity solutions in Hilbert spacespartial regularitystochastic delay equationspath-dependent equationsMerton problemMSC codes49L2593E2049K4560H1549L2035R1549L12
Feo et al. (Mon,) studied this question.