Title :
Geometry of cyclic pursuit
Author :
Galloway, K.S. ; Justh, E.W. ; Krishnaprasad, P.S.
Author_Institution :
Dept. of Electr. & Comput. Eng., Univ. of Maryland, College Park, MD, USA
Abstract :
Pursuit strategies (formulated using constant-speed particle models) provide a means for achieving cohesive behavior in systems of multiple mobile agents. In the present paper, we explore an n-agent cyclic pursuit scheme (i.e. agent i pursues agent i+1, modulo n) in which each agent employs a constant bearing pursuit strategy. We demonstrate the existence of an invariant submanifold, and state necessary and sufficient conditions for the existence of rectilinear and circling relative equilibria on that submanifold. We present a full analysis of steady-state solutions and stability characteristics for two-particle ¿mutual CB pursuit¿ and then outline steps to extend the nonlinear stability analysis to the many particle case.
Keywords :
geometry; mobile agents; stability; circling relative equilibria; cohesive behavior; constant bearing pursuit strategy; cyclic pursuit geometry; invariant submanifold; multiple mobile agents; mutual CB pursuit; n-agent cyclic pursuit scheme; nonlinear stability analysis; pursuit strategies; steady-state solutions; Equations; Geometry; Mobile agents; Remotely operated vehicles; Shape; Solid modeling; Stability analysis; Steady-state; Sufficient conditions; Vehicle dynamics;
Conference_Titel :
Decision and Control, 2009 held jointly with the 2009 28th Chinese Control Conference. CDC/CCC 2009. Proceedings of the 48th IEEE Conference on
Conference_Location :
Shanghai
Print_ISBN :
978-1-4244-3871-6
Electronic_ISBN :
0191-2216
DOI :
10.1109/CDC.2009.5399661
