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Optimal control of probability density functions of stochastic processes

    Mario Annunziato Affiliation
    ; Alfio Borzì Affiliation

Abstract

A Fokker‐Planck framework for the formulation of an optimal control strategy of stochastic processes is presented. Within this strategy, the control objectives are defined based on the probability density functions of the stochastic processes. The optimal control is obtained as the minimizer of the objective under the constraint given by the Fokker‐Planck model. Representative stochastic processes are considered with different control laws and with the purpose of attaining a final target configuration or tracking a desired trajectory. In this latter case, a receding‐horizon algorithm over a sequence of time windows is implemented.


Supported in part by the Austrian Science Fund FWF project F3205‐N18 “Fast Multigrid Methods for Inverse Problems”.


First published online: 10 Feb 2011

Keyword : probability density function control, Fokker–Planck equation, optimal control theory, receding–horizon, stochastic process

How to Cite
Annunziato, M., & Borzì, A. (2010). Optimal control of probability density functions of stochastic processes. Mathematical Modelling and Analysis, 15(4), 393-407. https://doi.org/10.3846/1392-6292.2010.15.393-407
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Nov 15, 2010
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This work is licensed under a Creative Commons Attribution 4.0 International License.