Title :
Second-order consensus with unknown dynamics via cyclic-small-gain method
Author :
Wang, Xiongfei ; Liu, Tiegen ; Qin, Jiahu
Author_Institution :
Coll. of Mechatron. & Autom., Nat. Univ. of Defense Technol., Changsha, China
Abstract :
This study proposes a distributed non-linear consensus protocol for second-order non-linear multi-agent systems with unknown locally Lipschitz dynamics and connected graph. The main analysis is based on a blend of graph-theoretic and non-linear-theoretic tools with the notion of input-to-state stability (ISS) playing a central role. Through the backstepping design, the closed-loop multi-agent system is transformed into a two-cascade interconnected system with proven ISS properties. Correspondingly, the recently developed cyclic-small-gain theorem is then employed to guarantee the asymptotic stability of the closed-loop multi-agent system, which implies consensus.
Keywords :
asymptotic stability; cascade control; cascade systems; closed loop systems; distributed control; graph theory; multi-robot systems; nonlinear control systems; asymptotic stability; backstepping design; closed-loop multiagent system; connected graph; cyclic-small-gain method; distributed nonlinear consensus protocol; graph theoretic tool; input-to-state stability; nonlinear-theoretic tool; second-order consensus; second-order nonlinear multiagent system; two-cascade interconnected system; unknown dynamics; unknown locally Lipschitz dynamics;
Journal_Title :
Control Theory & Applications, IET
DOI :
10.1049/iet-cta.2011.0393
