Boundary Consensus of Networked Hyperbolic Systems of Conservation Laws
成果类型:
Article
署名作者:
Zhan, Jingyuan; Zhang, Liguo; Qiao, Junfei
署名单位:
Beijing University of Technology
刊物名称:
IEEE TRANSACTIONS ON AUTOMATIC CONTROL
ISSN/ISSBN:
0018-9286
DOI:
10.1109/TAC.2025.3529281
发表日期:
2025
页码:
4989-5004
关键词:
topology
switches
Network topology
control systems
Multi-agent systems
Consensus protocol
steady-state
Boundary conditions
Synchronization
mathematical models
boundary control
consensus
hyperbolic partial differential equations
Lyapunov function
switching topology
摘要:
Concerning the consensus problem of a networked hyperbolic system of two linear conservation laws, this article proposes a boundary consensus protocol and establishes a theoretical framework for consensus analysis under both fixed and switching communication topologies. First, we present a consensus analysis under fixed topologies by utilizing the Lyapunov approach, where both undirected graph and digraph cases are considered. Under the assumption that the undirected graph is connected or the digraph is balanced and rooted, we derive sufficient conditions w.r.t. the boundary control matrices and Laplacian eigenvalues for ensuring the asymptotic consensus. Second, we further consider the consensus problem under switching topologies, in which the undirected graph (or balanced digraph) is relaxed to be jointly connected (or jointly rooted). By using the Lyapunov approach combined with the related space decomposition technique, we derive sufficient conditions w.r.t. the boundary control gain based on a priori knowledge of possible Laplacian matrices for ensuring the asymptotic consensus. Finally, we provide numerical examples and an application to the consensus control of a multilane road traffic flow system described by the Aw-Rascle equations, to demonstrate the effectiveness of our theoretical results.