Title :
Consensus between nonlinearly coupled discrete-time agents
Author :
Proskurnikov, Anton V.
Author_Institution :
Res. Inst. of Technol. & Manage., Univ. of Groningen, Groningen, Netherlands
Abstract :
The problem of consensus in discrete time multi-agent networks with nonlinear couplings is considered. The agents are identical but may have arbitrary order, the switching interaction topology and the couplings may be uncertain. We assume that the graph is undirected and remains connected, the couplings are anti-symmetric and satisfy some sector or, more generally, conic quadratic constraints. Using the Kalman-Szegö lemma and absolute stability theory techniques, consensus criteria for the networks of this type are obtained. These criteria are close in spirit to the celebrated Tsypkin and Jury-Lee criteria for stability of Lurie systems with sampled time.
Keywords :
directed graphs; discrete time systems; multi-agent systems; nonlinear systems; stability criteria; Kalman-Szegö lemma; Lurie systems; absolute stability theory techniques; anti-symmetric couplings; celebrated Tsypkin-Jury-Lee criteria; conic quadratic constraints; consensus criteria; discrete time multiagent networks; nonlinear consensus theory; nonlinearly coupled discrete-time agents; stability criteria; switching interaction topology; undirected graph; Couplings; MIMO; Network topology; Protocols; Robustness; Stability criteria; Topology;
Conference_Titel :
Control Conference (ECC), 2014 European
Conference_Location :
Strasbourg
Print_ISBN :
978-3-9524269-1-3
DOI :
10.1109/ECC.2014.6862617
