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Autores principales: Carè, Algo, Csáji, Balázs Csanád, Gerencsér, Balázs, Gerencsér, László, Rásonyi, Miklós
Formato: Preprint
Publicado: 2019
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Acceso en línea:https://arxiv.org/abs/1906.09464
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author Carè, Algo
Csáji, Balázs Csanád
Gerencsér, Balázs
Gerencsér, László
Rásonyi, Miklós
author_facet Carè, Algo
Csáji, Balázs Csanád
Gerencsér, Balázs
Gerencsér, László
Rásonyi, Miklós
contents In this paper we revisit a fundamental technical issue within the theory of stochastic approximation (SA) in a Markovian framework, first proposed in the book by Djereveckii and Fradkov (1981), and further developed in much detail in the book by Benveniste, M{é}tivier, and Priouret (1990). This theory is instrumental in many application areas such as the statistical analysis of Hidden Markov Models arising in telecommunication, quantized linear stochastic systems, and more recently in active learning and reinforcement learning. The problem at hand is the verification of the existence, uniqueness and Lipschitz-continuity of the solution of a parameter-dependent Poisson equation, in an appropriate weighted sup-norm, associated with a collection of Markov chains on general state spaces. Verification of the above facts is vital in the analysis of SA processes presented in (Benveniste et al., 1990) via the ODE (ordinary differential equations) method, requiring substantial technical effort. The motivation and focus of the paper is to address this technical issue, by presenting a simple set of conditions, under which the above properties of the Poisson equation at hand can be conveniently established. The starting point of our work is an intricate result of Hairer and Mattingly (2011) proving that by tilting standard conditions of mainstream stability theory for Markov chains, the transition kernels prove to be contractions in the space of differences of probability measures in a suitable metric. To demonstrate the applicability of our results, the proposed conditions are verified for a class of queuing system with open-loop control.
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publishDate 2019
record_format arxiv
spellingShingle Stochastic Approximation in a Markovian Framework Revisited: Lipschitz Continuity of the Poisson Equation
Carè, Algo
Csáji, Balázs Csanád
Gerencsér, Balázs
Gerencsér, László
Rásonyi, Miklós
Probability
Systems and Control
60J05
In this paper we revisit a fundamental technical issue within the theory of stochastic approximation (SA) in a Markovian framework, first proposed in the book by Djereveckii and Fradkov (1981), and further developed in much detail in the book by Benveniste, M{é}tivier, and Priouret (1990). This theory is instrumental in many application areas such as the statistical analysis of Hidden Markov Models arising in telecommunication, quantized linear stochastic systems, and more recently in active learning and reinforcement learning. The problem at hand is the verification of the existence, uniqueness and Lipschitz-continuity of the solution of a parameter-dependent Poisson equation, in an appropriate weighted sup-norm, associated with a collection of Markov chains on general state spaces. Verification of the above facts is vital in the analysis of SA processes presented in (Benveniste et al., 1990) via the ODE (ordinary differential equations) method, requiring substantial technical effort. The motivation and focus of the paper is to address this technical issue, by presenting a simple set of conditions, under which the above properties of the Poisson equation at hand can be conveniently established. The starting point of our work is an intricate result of Hairer and Mattingly (2011) proving that by tilting standard conditions of mainstream stability theory for Markov chains, the transition kernels prove to be contractions in the space of differences of probability measures in a suitable metric. To demonstrate the applicability of our results, the proposed conditions are verified for a class of queuing system with open-loop control.
title Stochastic Approximation in a Markovian Framework Revisited: Lipschitz Continuity of the Poisson Equation
topic Probability
Systems and Control
60J05
url https://arxiv.org/abs/1906.09464