Further Improvements on Non-Negative Edge Consensus of Networked Systems

In this article, the non-negative edge consensus problem is addressed for positive networked systems with undirected graphs using state-feedback protocols. In contrast to existing results, the major contributions of this work included: 1) significantly improved criteria of consequentiality and non-negativity, therefore leading to a linear programming approach and 2) necessary and sufficient criteria giving rise to a semidefinite programming approach. Specifically, an improved upper bound is given for the maximum eigenvalue of the Laplacian matrix and the (out-) in-degree of the degree matrix, and an improved consensuability and non-negativevity condition is obtained. The sufficient condition presented only requires the number of edges of a nodal network without the connection topology. Also, with the introduction of slack matrix variables, two equivalent conditions of consensuability and non-negativevity are obtained. In the conditions, the system matrices, controller gain, as well as Lyapunov matrices are separated, which is helpful for parameterization. Based on the results, a semidefinite programming algorithm for the controller is readily developed. Finally, a comprehensive analytical and numerical comparison of three illustrative examples is conducted to show that the proposed results are less conservative than the existing work.

Automated summary

This article addresses the non-negative edge consensus problem for positive networked systems with undirected graphs using state-feedback protocols, presenting significantly improved criteria and algorithms. Separating the system matrices, controller gain, and Lyapunov matrices leads to parameterization of the conditions for consensus and non-negativity. The results are shown to be less conservative than existing work through comprehensive analytical and numerical comparisons of illustrative examples.