Minimal Controllability Problems

Оlshevsky, А.G.

doi:10.1109/tcns.2014.2337974

Cited by 300 publications

(341 citation statements)

References 38 publications

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“…It can be shown that, while Trace(W −1 K,T ) measures the average control energy over random target states, Det(W K,T ) is proportional to the volume of the ellipsoid containing the states that can be reached with a unit-energy control input. The selection of the control nodes for the optimization of these metrics is usually a computationally hard combinatorial problem [13], for which heuristics without performance guarantees and non-scalable optimization procedures have been proposed [21], [24], [25].…”

Section: Network Model and Preliminary Resultsmentioning

confidence: 99%

“…We depart from [5], [6], [8], [11], and analogously from [12], [13], [14], by adopting a quantitative measure of network controllability, namely the worst-case control energy, by characterizing tradeoffs between the difficulty of the control task and the number of control nodes and, finally, by proposing an open-loop control strategy suitable for complex networks.…”

Section: Introductionmentioning

confidence: 99%

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Controllability metrics, limitations and algorithms for complex networks

Pasqualetti

Zampieri

Bullo

2014

2014 American Control Conference

111

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Abstract-This paper studies the problem of controlling complex networks, that is, the joint problem of selecting a set of control nodes and of designing a control input to steer a network to a target state. For this problem (i) we propose a metric to quantify the difficulty of the control problem as a function of the required control energy, (ii) we derive bounds based on the system dynamics (network topology and weights) to characterize the tradeoff between the control energy and the number of control nodes, and (iii) we propose an open-loop control strategy with performance guarantees. In our strategy we select control nodes by relying on network partitioning, and we design the control input by leveraging optimal and distributed control techniques. Our findings show several control limitations and properties. For instance, for Schur stable and symmetric networks: (i) if the number of control nodes is constant, then the control energy increases exponentially with the number of network nodes, (ii) if the number of control nodes is a fixed fraction of the network nodes, then certain networks can be controlled with constant energy independently of the network dimension, and (iii) clustered networks may be easier to control because, for sufficiently many control nodes, the control energy depends only on the controllability properties of the clusters and on their coupling strength. We validate our results with examples from power networks, social networks, and epidemics spreading.

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Section: Network Model and Preliminary Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Controllability metrics, limitations and algorithms for complex networks

Pasqualetti

Zampieri

Bullo

2014

2014 American Control Conference

111

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“…ky k (t) > } for some arbitrary > 0, the first two conditions are satisfied by (23), (24). By the definition of asymptotic empirical degree distributions lim…”

Section: Appendix E Proof Of Theoremmentioning

confidence: 99%

Optimality of Fast-Matching Algorithms for Random Networks With Applications to Structural Controllability

Faradonbeh¹,

Tewari

Michailidis

2017

IEEE Trans. Control Netw. Syst.

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Network control refers to a very large and diverse set of problems including controllability of linear time-invariant dynamical systems, where the objective is to select an appropriate input to steer the network to a desired state. There are many notions of controllability, one of them being structural controllability, which is intimately connected to finding maximum matchings on the underlying network topology. In this work, we study fast, scalable algorithms for finding maximum matchings for a large class of random networks. First, we illustrate that degree distribution random networks are realistic models for real networks in terms of structural controllability. Subsequently, we analyze a popular, fast and practical heuristic due to Karp and Sipser as well as a simplification of it. For both heuristics, we establish asymptotic optimality and provide results concerning the asymptotic size of maximum matchings for an extensive class of random networks.

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“…A recent trend in the literature is to investigate the controllability of large-scale complex networks such as those appearing in a broad spectrum of scientific disciplines, ranging from Biology to Social Sciences, from Technology to Engineering. When no a-priori information is available, then an interesting problem investigated for instance in [2], [3] is to determine what is the minimal number of driver nodes that allows to guarantee controllability.…”

Section: Introductionmentioning

confidence: 99%

“…When instead a set of weights is given, then the construction of a minimal set of driver nodes can rely upon other well-established controllability tests. For instance in [6] a method based on the PBH test is introduced, while in [3] a thorough estimate of the minimal number of driver nodes is computed. Other characterizations of such "input selection" problem appear in [7], [8], [9].…”

Section: Introductionmentioning

confidence: 99%

Positive controllability of large-scale networks

Lindmark

Altafini

2016

2016 European Control Conference (ECC)

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Abstract-In this paper, we study the problem of controlling large scale networks with controls which can assume only positive values. Given an adjacency matrix A, an algorithm is developed that constructs an input matrix B with a minimal number of columns such that the resulting system (A, B) is positively controllable. The algorithm combines the graphical methods used for structural controllability analysis with the theory of positive linear dependence. The number of control inputs guaranteeing positive controllability is near optimal.

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Minimal Controllability Problems

Cited by 300 publications

References 38 publications

Controllability metrics, limitations and algorithms for complex networks

Controllability metrics, limitations and algorithms for complex networks

Optimality of Fast-Matching Algorithms for Random Networks With Applications to Structural Controllability

Positive controllability of large-scale networks

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