Structural Controllability of an NDS With LFT Parameterized Subsystems

This paper studies structural controllability for a networked dynamic system (NDS), in which each subsystem may have different dynamics, and unknown parameters may exist both in subsystem dynamics and in subsystem interconnections. In addition, subsystem parameters are parameterized by a linear fractional transformation. It is proven that controllability keeps to be a generic property for this kind of NDSs. Some necessary and sufficient conditions are then established, respectively, for them to be structurally controllable, to have a fixed uncontrollable mode, and to have a parameter-dependent uncontrollable mode, under the condition that each subsystem interconnection link can take a weight independently. These conditions are scalable, and in their verifications, all arithmetic calculations are performed separately on each subsystem. In addition, these conditions also reveal influences on NDS controllability from subsystem input–output relations, subsystem uncontrollable modes, and subsystem interconnection topology. Based on these observations, the problem of selecting the minimal number of subsystem interconnection links is studied under the requirement of constructing a structurally controllable NDS. A heuristic method is derived with some provable approximation bounds and a low computational complexity.

[1]  Soummya Kar,et al.  Composability and controllability of structural linear time-invariant systems: Distributed verification , 2017, Autom..

[2]  Yuan Zhang,et al.  On the edge insertion/deletion and controllability distance of linear structural systems , 2017, 2017 IEEE 56th Annual Conference on Decision and Control (CDC).

[3]  Yuan Zhang,et al.  Input matrix construction and approximation using a graphic approach , 2018, Int. J. Control.

[4]  W. Marsden I and J , 2012 .

[5]  Cédric Langbort,et al.  Distributed control design for systems interconnected over an arbitrary graph , 2004, IEEE Transactions on Automatic Control.

[6]  Yuan Zhang,et al.  Controllability Analysis for a Networked Dynamic System With Autonomous Subsystems , 2017, IEEE Transactions on Automatic Control.

[7]  Soummya Kar,et al.  Structurally Observable Distributed Networks of Agents Under Cost and Robustness Constraints , 2017, IEEE Transactions on Signal and Information Processing over Networks.

[8]  Noah J. Cowan,et al.  Nodal Dynamics, Not Degree Distributions, Determine the Structural Controllability of Complex Networks , 2011, PloS one.

[9]  Jacob T. Schwartz,et al.  Fast Probabilistic Algorithms for Verification of Polynomial Identities , 1980, J. ACM.

[10]  Florian Dörfler,et al.  Attack Detection and Identification in Cyber-Physical Systems -- Part II: Centralized and Distributed Monitor Design , 2012, ArXiv.

[11]  Charles R. Johnson,et al.  Topics in Matrix Analysis , 1991 .

[12]  Sanjeev Arora,et al.  Computational Complexity: A Modern Approach , 2009 .

[13]  B. Anderson,et al.  Structural controllability and matrix nets , 1982 .

[14]  Danna Zhou,et al.  d. , 1934, Microbial pathogenesis.

[15]  J. Doyle,et al.  Robust and optimal control , 1995, Proceedings of 35th IEEE Conference on Decision and Control.

[16]  Katsuhiko Ogata,et al.  Modern Control Engineering , 1970 .

[17]  Jacques L. Willems,et al.  Structural controllability and observability , 1986 .

[18]  Mehran Mesbahi,et al.  Controllability and Observability of Network-of-Networks via Cartesian Products , 2014, IEEE Transactions on Automatic Control.

[19]  P. Cochat,et al.  Et al , 2008, Archives de pediatrie : organe officiel de la Societe francaise de pediatrie.

[20]  Alexander Olshevsky,et al.  Minimal Controllability Problems , 2013, IEEE Transactions on Control of Network Systems.

[21]  Usman A. Khan,et al.  On the Genericity Properties in Distributed Estimation: Topology Design and Sensor Placement , 2012, IEEE Journal of Selected Topics in Signal Processing.

[22]  Kazuo Murota,et al.  Matrices and Matroids for Systems Analysis , 2000 .

[23]  Mohammad Aldeen,et al.  Stabilization of decentralized control systems , 1997 .

[24]  D. West Introduction to Graph Theory , 1995 .

[25]  Albert-László Barabási,et al.  Controllability of complex networks , 2011, Nature.

[26]  Sk Katti Decentralized control of linear multivariable systems , 1981 .

[27]  Christian Commault,et al.  Generic properties and control of linear structured systems: a survey , 2003, Autom..

[28]  H. Mayeda,et al.  Strong Structural Controllability , 1979 .

[29]  Bahman Gharesifard,et al.  Classification of the Structurally Controllable Zero-Patterns for Driftless Bilinear Control Systems , 2019, IEEE Transactions on Control of Network Systems.

[30]  K. Murota Refined study on structural controllability of descriptor systems by means of matroids , 1987 .

[31]  Amir Yehudayoff,et al.  Arithmetic Circuits: A survey of recent results and open questions , 2010, Found. Trends Theor. Comput. Sci..

[32]  Ching-tai Lin Structural controllability , 1974 .

[33]  Russell Impagliazzo,et al.  Derandomizing Polynomial Identity Tests Means Proving Circuit Lower Bounds , 2003, STOC '03.

[34]  Thomas Kailath,et al.  Linear Systems , 1980 .

[35]  D. Luenberger,et al.  Generic properties of column-structured matrices , 1985 .

[36]  Tong Zhou,et al.  On the controllability and observability of networked dynamic systems , 2014, Autom..

[37]  K. Lu,et al.  Rational function matrices and structural controllability and observability , 1991 .

[38]  Lin Wang,et al.  Controllability of networked MIMO systems , 2015, Autom..

[39]  Tong Zhou,et al.  Minimal inputs/outputs for subsystems in a networked system , 2016, Autom..

[40]  Francesco Bullo,et al.  Controllability Metrics, Limitations and Algorithms for Complex Networks , 2013, IEEE Transactions on Control of Network Systems.

[41]  Magnus Egerstedt,et al.  Controllability of Multi-Agent Systems from a Graph-Theoretic Perspective , 2009, SIAM J. Control. Optim..

[42]  Basel Alomair,et al.  Input Selection for Performance and Controllability of Structured Linear Descriptor Systems , 2017, SIAM J. Control. Optim..

[43]  Eugene L. Lawler,et al.  Matroid intersection algorithms , 1975, Math. Program..

[44]  J. P. Corfmat,et al.  Structurally controllable and structurally canonical systems , 1976 .

[45]  Laurence A. Wolsey,et al.  An analysis of the greedy algorithm for the submodular set covering problem , 1982, Comb..