论文信息 - Weak conditions for average optimality in Markov control processes

Weak conditions for average optimality in Markov control processes

Abstract In this paper we study the existence of average cost optimal policies for Markov control processes on Borel spaces and with possibly unbounded costs and controls. Under assumptions weaker than those used in the previous literature, we show that the ‘optimality inequality’ holds everywhere, and that there exists a stationary policy which is optimal whenever the initial state lies in a possibly proper subset of the state space. This is in contrast to previous works where an implicit ‘unichain’ assumption ensures optimality for all initial states.

Onésimo Hernández-Lerma | O. Hernández-Lerma

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

[2] L. Sennott. The Average Cost Optimality Equation and Critical Number Policies , 1993 .

[3] Onésimo Hernández-Lerma,et al. Discrete-time Markov control processes with discounted unbounded costs: Optimality criteria , 1992, Kybernetika.

[4] Onésimo Hernández-Lerma,et al. Controlled Markov Processes , 1965 .

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

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

[7] U. Rieder. Measurable selection theorems for optimization problems , 1978 .

[8] O. Hernández-Lerma. Adaptive Markov Control Processes , 1989 .

[9] E. Denardo. On Linear Programming in a Markov Decision Problem , 1970 .

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