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Laplacian Dynamics on Cographs: Controllability Analysis Through Joins and Unions

Shima Sadat Mousavi, Mohammad Haeri, Mehran Mesbahi

2020IEEE Transactions on Automatic Control26 citationsDOIOpen Access PDF

Abstract

In this article, we examine the controllability of Laplacian dynamic networks on cographs. Cographs appear in modeling a wide range of networks and include as special instances, the threshold graphs. In this article, we present necessary and sufficient conditions for the controllability of cographs, and provide an efficient method for selecting a minimal set of input nodes from which the network is controllable. In particular, we define a sibling partition in a cograph and show that the network is controllable if all nodes of any cell of this partition except one are chosen as control nodes. The key ingredient for such characterizations is the intricate connection between the modularity of cographs and their modal properties. Finally, we use these results to characterize the controllability conditions for certain subclasses of cographs.

Topics & Concepts

ControllabilityMathematicsPartition (number theory)JoinsLinear subspaceTopology (electrical circuits)Theoretical computer scienceLaplacian matrixDiscrete mathematicsSet (abstract data type)Laplace operatorNetwork controllabilityComplex networkVertex (graph theory)Computer scienceModularity (biology)Range (aeronautics)Key (lock)GraphConnection (principal bundle)Complement (music)Network dynamicsGraph theoryParameterized complexityBridging (networking)ReciprocalNetwork topologyMarkov chainInvariant (physics)Mathematical optimizationGene Regulatory Network AnalysisNeural Networks Stability and SynchronizationComplex Network Analysis Techniques
Laplacian Dynamics on Cographs: Controllability Analysis Through Joins and Unions | Litcius