论文信息 - Optimal stochastic switching and the Dirichlet problem for the Bellman equation

Optimal stochastic switching and the Dirichlet problem for the Bellman equation

ABSTcRT. Let L' be a sequence of second order elliptic operators in a bounded n-dimensional domain Q, and let f' be given functions. Consider the problem of finding a solution u to the Bellman equation sup5(Lu f) 0 a.e. in Q, subject to the Dirichiet boundary condition u = 0 on M2. It is proved that, provided the leading coefficients of the L' are constants, there exists a unique solution u of this problem, belonging to W" '(Q) i W12',d(9). The solution is obtained as a limit of solutions of certain weakly coupled systems of nonlinear elliptic equations; each component of the vector solution converges to u. Although the proof is entirely analytic, it is partially motivated by models of stochastic control. We solve also certain systems of variational inequalities corresponding to switching with cost.

Avner Friedman | Lawrence C. Evans | L. Evans | A. Friedman

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