Fast Structured Nuclear Norm Minimization With Applications to Set Membership Systems Identification

Set membership identification seeks to obtain models amenable to be used in a robust control framework. While under suitable assumptions this problem is convex, existing methods lead to high order models. As we show in this note, this difficulty can be avoided by recasting the problem as a structured nuclear norm minimization. To solve this problem, we propose a computationally efficient first order algorithm that requires performing only a combination of thresholding and eigenvalue decomposition steps. Finally, since the optimization is carried out only over sequences compatible with the output responses of stable systems, the identified model is guaranteed to be stable.

[1]  B. Pasik-Duncan Control-oriented system identification: An H∞ approach , 2002 .

[2]  Emmanuel J. Candès,et al.  A Singular Value Thresholding Algorithm for Matrix Completion , 2008, SIAM J. Optim..

[3]  Antonio Vicino,et al.  Optimal estimation theory for dynamic systems with set membership uncertainty: An overview , 1991, Autom..

[4]  Mario Sznaier,et al.  Open-loop worst-case identification of nonSchur plants , 2003, Autom..

[5]  Asok Ray,et al.  Life-extending control of mechanical structures: Experimental verification of the concept , 1998, Autom..

[6]  Mustafa Ayazoglu,et al.  An algorithm for fast constrained nuclear norm minimization and applications to systems identification , 2012, 2012 IEEE 51st IEEE Conference on Decision and Control (CDC).

[7]  Lieven Vandenberghe,et al.  Interior-Point Method for Nuclear Norm Approximation with Application to System Identification , 2009, SIAM J. Matrix Anal. Appl..

[8]  Dimitri P. Bertsekas,et al.  On the Douglas—Rachford splitting method and the proximal point algorithm for maximal monotone operators , 1992, Math. Program..

[9]  K. Glover All optimal Hankel-norm approximations of linear multivariable systems and their L, ∞ -error bounds† , 1984 .

[10]  Bart De Moor,et al.  N4SID: Subspace algorithms for the identification of combined deterministic-stochastic systems , 1994, Autom..

[11]  Yi Ma,et al.  The Augmented Lagrange Multiplier Method for Exact Recovery of Corrupted Low-Rank Matrices , 2010, Journal of structural biology.

[12]  Stephen P. Boyd,et al.  Distributed Optimization and Statistical Learning via the Alternating Direction Method of Multipliers , 2011, Found. Trends Mach. Learn..

[13]  M. Fazel,et al.  Reweighted nuclear norm minimization with application to system identification , 2010, Proceedings of the 2010 American Control Conference.

[14]  Mustafa Ayazoglu,et al.  Fast sparse subspace identification tools with applications to dynamic vision , 2012 .

[15]  Pablo A. Parrilo,et al.  Robust identification with mixed parametric/nonparametric models and time/frequency-domain experiments: theory and an application , 2001, IEEE Trans. Control. Syst. Technol..