English

Certainty Equivalent Quadratic Control for Markov Jump Systems

Optimization and Control 2021-05-27 v1 Machine Learning Systems and Control Systems and Control

Abstract

Real-world control applications often involve complex dynamics subject to abrupt changes or variations. Markov jump linear systems (MJS) provide a rich framework for modeling such dynamics. Despite an extensive history, theoretical understanding of parameter sensitivities of MJS control is somewhat lacking. Motivated by this, we investigate robustness aspects of certainty equivalent model-based optimal control for MJS with quadratic cost function. Given the uncertainty in the system matrices and in the Markov transition matrix is bounded by ϵ\epsilon and η\eta respectively, robustness results are established for (i) the solution to coupled Riccati equations and (ii) the optimal cost, by providing explicit perturbation bounds which decay as O(ϵ+η)\mathcal{O}(\epsilon + \eta) and O((ϵ+η)2)\mathcal{O}((\epsilon + \eta)^2) respectively.

Keywords

Cite

@article{arxiv.2105.12358,
  title  = {Certainty Equivalent Quadratic Control for Markov Jump Systems},
  author = {Zhe Du and Yahya Sattar and Davoud Ataee Tarzanagh and Laura Balzano and Samet Oymak and Necmiye Ozay},
  journal= {arXiv preprint arXiv:2105.12358},
  year   = {2021}
}

Comments

17 pages, 8 figures

R2 v1 2026-06-24T02:28:30.520Z