Disturbance Attenuation in a Consensus Network of Identical Linear Systems: An $ {\cal H}_{\infty }$ Approach

We consider two problems related to disturbance attenuation in undirected consensus networks of identical linear systems subject to exogenous disturbances: 1) network interconnection design and 2) design of distributed and decentralized controllers. We use the H∞ norm of the transfer function from the disturbance vector to the disagreement vector of the network as the performance metric for disturbance attenuation. We show that the disturbance attenuation performance is enhanced by maximizing the second smallest eigenvalue of the graph Laplacian under a certain condition, which can be checked using a linear matrix inequality. For the case of a consensus network with fixed interconnection weights, e.g., as the result of physical constraints, we provide algorithms for the design of both decentralized and distributed controllers that ensure a prescribed disturbance attenuation performance.

[1]  Timothy W. McLain,et al.  Coordination Variables and Consensus Building in Multiple Vehicle Systems , 2004 .

[2]  Lin Huang,et al.  Consensus of Multiagent Systems and Synchronization of Complex Networks: A Unified Viewpoint , 2016, IEEE Transactions on Circuits and Systems I: Regular Papers.

[3]  Ji-Feng Zhang,et al.  Necessary and Sufficient Conditions for Consensusability of Linear Multi-Agent Systems , 2010, IEEE Transactions on Automatic Control.

[4]  Alan J. Laub,et al.  Matrix analysis - for scientists and engineers , 2004 .

[5]  Stephen P. Boyd Convex optimization of graph Laplacian eigenvalues , 2006 .

[6]  Richard M. Murray,et al.  INFORMATION FLOW AND COOPERATIVE CONTROL OF VEHICLE FORMATIONS , 2002 .

[7]  Junping Du,et al.  Dynamic output feedback control for consensus of multi-agent systems: An H∞ approach , 2009, 2009 American Control Conference.

[8]  Wei Ren,et al.  Information consensus in multivehicle cooperative control , 2007, IEEE Control Systems.

[9]  Stephen P. Boyd,et al.  The Fastest Mixing Markov Process on a Graph and a Connection to a Maximum Variance Unfolding Problem , 2006, SIAM Rev..

[10]  Reza Olfati-Saber,et al.  Consensus and Cooperation in Networked Multi-Agent Systems , 2007, Proceedings of the IEEE.

[11]  Z. Duan,et al.  On H ∞ and H 2 performance regions of multi-agent systems ✩ , 2011 .

[12]  P. Gahinet,et al.  A linear matrix inequality approach to H∞ control , 1994 .

[13]  Zhisheng Duan,et al.  On H∞ and H2 performance regions of multi-agent systems , 2011, Autom..