Litcius/Paper detail

Full Information H2 Control of Borel-Measurable Markov Jump Systems with Multiplicative Noises

Hongji Ma, Yang Wang

2021Mathematics23 citationsDOIOpen Access PDF

Abstract

This paper addresses an H2 optimal control problem for a class of discrete-time stochastic systems with Markov jump parameter and multiplicative noises. The involved Markov jump parameter is a uniform ergodic Markov chain taking values in a Borel-measurable set. In the presence of exogenous white noise disturbance, Gramian characterization is derived for the H2 norm, which quantifies the stationary variance of output response for the considered systems. Moreover, under the condition that full information of the system state is accessible to measurement, an H2 dynamic optimal control problem is shown to be solved by a zero-order stabilizing feedback controller, which can be represented in terms of the stabilizing solution to a set of coupled stochastic algebraic Riccati equations. Finally, an iterative algorithm is provided to get the approximate solution of the obtained Riccati equations, and a numerical example illustrates the effectiveness of the proposed algorithm.

Topics & Concepts

MathematicsMultiplicative noiseMarkov chainMultiplicative functionApplied mathematicsErgodicityAlgebraic Riccati equationControl theory (sociology)Ergodic theoryRiccati equationMathematical optimizationComputer scienceMathematical analysisControl (management)Differential equationArtificial intelligenceAnalog signalStatisticsDigital signal processingComputer hardwareSignal transfer functionStability and Control of Uncertain SystemsControl Systems and IdentificationAdvanced Control Systems Optimization
Full Information H2 Control of Borel-Measurable Markov Jump Systems with Multiplicative Noises | Litcius