English

Parameterization of Stabilizing Linear Coherent Quantum Controllers

Quantum Physics 2015-03-10 v1 Systems and Control Optimization and Control

Abstract

This paper is concerned with application of the classical Youla-Ku\v{c}era parameterization to finding a set of linear coherent quantum controllers that stabilize a linear quantum plant. The plant and controller are assumed to represent open quantum harmonic oscillators modelled by linear quantum stochastic differential equations. The interconnections between the plant and the controller are assumed to be established through quantum bosonic fields. In this framework, conditions for the stabilization of a given linear quantum plant via linear coherent quantum feedback are addressed using a stable factorization approach. The class of stabilizing quantum controllers is parameterized in the frequency domain. Also, this approach is used in order to formulate coherent quantum weighted H2H_2 and HH_\infty control problems for linear quantum systems in the frequency domain. Finally, a projected gradient descent scheme is proposed to solve the coherent quantum weighted H2H_2 control problem.

Keywords

Cite

@article{arxiv.1503.02118,
  title  = {Parameterization of Stabilizing Linear Coherent Quantum Controllers},
  author = {Arash Kh. Sichani and Ian R. Petersen and Igor G. Vladimirov},
  journal= {arXiv preprint arXiv:1503.02118},
  year   = {2015}
}

Comments

11 pages, 4 figures, a version of this paper is to appear in the Proceedings of the 10th Asian Control Conference, Kota Kinabalu, Malaysia, 31 May - 3 June, 2015

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