Approximating labelled Markov processes

被引：55

作者：

Desharnais, J ^{[1
]}

Gupta, V

Jagadeesan, R

Panangaden, P

机构：

[1] McGill Univ, Sch Comp Sci, Montreal, PQ H3A 2A7, Canada

[2] Depaul Univ, Sch CTI, Chicago, IL 60604 USA

[3] Google Inc, Mountain View, CA 94043 USA

[4] Univ Laval, Dept Informat, Ste Foy, PQ G1K 7P4, Canada

来源：

INFORMATION AND COMPUTATION | 2003年 / 184卷 / 01期

关键词：

D O I：

10.1016/S0890-5401(03)00051-8

中图分类号：

TP301 [理论、方法];

学科分类号：

081202 ;

摘要：

Labelled Markov processes are probabilistic versions of labelled transition systems. In general, the state space of a labelled Markov process may be a continuum. In this paper, we study approximation techniques for continuous-state labelled Markov processes. We show that the collection of labelled Markov processes carries a Polish-space structure with a countable basis given by finite-state Markov chains with rational probabilities; thus permitting the approximation of quantitative observations (e.g., an integral of a continuous function) of a continuous-state labelled Markov process by the observations on finite-state Markov chains. The primary technical tools that we develop to reach these results are A variant of a finite-model theorem for the modal logic used to characterize bisimulation, and an isomorphism between the poset of Markov processes (ordered by simulation) with the omega-continuous dcpo Proc (defined as the solution of the recursive domain equation Proc = Pi(L) P-Pr(Proc)). The isomorphism between labelled Markov processes and Proc can be independently viewed as a full-abstraction result relating an operational (labelled Markov process) and a denotational (Proc) model and yields a logic complete for reasoning about simulation for continuous-state processes. (C) 2003 Elsevier Science (USA). All rights reserved.

引用

页码：160 / 200

页数：41

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