论文信息 - Convex stochastic control problems

Convex stochastic control problems

The solution of the infinite horizon stochastic control problem under certain criteria, the functional characterization and computation of optimal values and policies, is related to two dynamic programming-like functional equations: the discounted cost optimality equation (DCOE) and the average cost optimality equation (ACOE). The authors consider what useful properties, shared by large and important problem classes, can be used to show that an ACOE holds, and how these properties can be exploited to aid in the development of tractable algorithmic solutions. They address this issue by concentrating on structured solutions to stochastic control models. By a structured solution is meant a model for which value functions and/or optimal policies have some special dependence on the (initial) state. The focus is on convexity properties of the value function.<<ETX>>

A. Arapostathis | E. Fernández-Gaucherand | S. Marcus

[1] E. B. Dynkin. STOCHASTIC CONCAVE DYNAMIC PROGRAMMING , 1972 .

[2] Dimitri P. Bertsekas,et al. Dynamic Programming: Deterministic and Stochastic Models , 1987 .

[3] Linn I. Sennott,et al. Average Cost Optimal Stationary Policies in Infinite State Markov Decision Processes with Unbounded Costs , 1989, Oper. Res..

[4] O. Hernández-Lerma,et al. Average cost optimal policies for Markov control processes with Borel state space and unbounded costs , 1990 .

[5] O. Hernández-Lerma. Average optimality in dynamic programming on Borel spaces: unbounded costs and controls , 1991 .

[6] A. Arapostathis,et al. Remarks on the existence of solutions to the average cost optimality equation in Markov decision processes , 1991 .

[7] R. Cavazos-Cadena. A counterexample on the optimality equation in Markov decision chains with the average cost criterion , 1991 .

[8] Steven I. Marcus,et al. Structured solutions for stochastic control problems , 1992 .

[9] Onésimo Hernández Lerma,et al. Monotone approximations for convex stochastic control problems , 1992 .

[10] M. K. Ghosh,et al. Discrete-time controlled Markov processes with average cost criterion: a survey , 1993 .