Use of an homographic transformation jointly to the singular perturbation for the resolution of Markov chains. Application to the operational safety study

D. Racoceanu, A. El Moudni, M. Ferney, S. Zerhouni

Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

Abstract

Our work concerns the adaptation of the singular perturbation method jointly to the homographic transformation to the category of ergodic Markov chains which presents the two-time-scale property. For Markov chains, the two-time-scale property becomes a property of two-weighting-scale of the states in the system evolution [7]. This lead us to call the slow and fast parts of a decomposed system strong and respectively weak. The limit resolution methodology of the Markov chains by the method of singular perturbation assumes firstly the detection of the irreductible classes of the chain, and secondly, the decomposition of each final ergodic classes presenting the two-weighting-scale property. In the resolution at the limit of the decomposed system, we struck the problem of the stochasticity of the subsystems obtained using directly the singular perturbation method. Indeed, the strong and weak submatrix are not stochastic matrix. In our method, we use the homographic transformation in order to make stochastic the strong part matrix.

Original languageEnglish
Title of host publicationProceedings - IEEE International Conference on Robotics and Automation
PublisherPubl by IEEE
Pages3544-3549
Number of pages6
Editionpt 4
ISBN (Print)0818653329
StatePublished - 1994
Externally publishedYes
EventProceedings of the 1994 IEEE International Conference on Robotics and Automation - San Diego, CA, USA
Duration: 8 May 199413 May 1994

Publication series

NameProceedings - IEEE International Conference on Robotics and Automation
Numberpt 4
ISSN (Print)1050-4729

Conference

ConferenceProceedings of the 1994 IEEE International Conference on Robotics and Automation
CitySan Diego, CA, USA
Period8/05/9413/05/94

Fingerprint

Dive into the research topics of 'Use of an homographic transformation jointly to the singular perturbation for the resolution of Markov chains. Application to the operational safety study'. Together they form a unique fingerprint.

Cite this