TY - GEN
T1 - Use of an homographic transformation jointly to the singular perturbation for the resolution of Markov chains. Application to the operational safety study
AU - Racoceanu, D.
AU - El Moudni, A.
AU - Ferney, M.
AU - Zerhouni, S.
PY - 1994
Y1 - 1994
N2 - 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.
AB - 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.
UR - http://www.scopus.com/inward/record.url?scp=0028055354&partnerID=8YFLogxK
M3 - Conference contribution
AN - SCOPUS:0028055354
SN - 0818653329
T3 - Proceedings - IEEE International Conference on Robotics and Automation
SP - 3544
EP - 3549
BT - Proceedings - IEEE International Conference on Robotics and Automation
PB - Publ by IEEE
T2 - Proceedings of the 1994 IEEE International Conference on Robotics and Automation
Y2 - 8 May 1994 through 13 May 1994
ER -