论文信息 - Robustness of inverse perturbation for discrete event control

Robustness of inverse perturbation for discrete event control

We study the robustness of the inverse perturbation solution in discrete-time systems modeled by homogeneous Markov chains. We cast the optimal inverse perturbation control as a strictly convex optimization problem, which admits a unique global solution. We show that the optimal inverse perturbation control is robust to estimation errors in the original network. The derived results are applied to the Human melanoma gene regulatory network, where the aim is to force the network to converge to a desired steady-state distribution of gene regulation.

[1] Aniruddha Datta,et al. Optimal infinite horizon control for probabilistic Boolean networks , 2006, 2006 American Control Conference.

[2] Xi-Ren Cao,et al. Perturbation analysis of discrete event dynamic systems , 1991 .

[3] Charles L. Byrne,et al. Signal Processing: A Mathematical Approach , 1993 .

[4] P J Schweitzer,et al. Perturbation series expansions for nearly completely-decomposable Markov chains , 1986 .

[5] Stephen P. Boyd,et al. Convex Optimization , 2004, Algorithms and Theory of Computation Handbook.

[6] N. Nilsson. STUART RUSSELL AND PETER NORVIG, ARTIFICIAL INTELLIGENCE: A MODERN APPROACH , 1996 .

[7] Dan Schonfeld,et al. Inverse perturbation for optimal intervention in gene regulatory networks , 2011, Bioinform..

[8] Peter Norvig,et al. Artificial Intelligence: A Modern Approach , 1995 .

[9] E. Chong,et al. Optimization of queues using an infinitesimal perturbation analysis-based stochastic algorithm with general update times , 1993 .