Open AccessThe Multi-Agent Rendezvous Problem. Part 2: The Asynchronous Case
Author(s) -
Jiaxin Lin,
A. Stephen Morse,
Brian D. O. Anderson
Publication year - 2007
Publication title -
siam journal on control and optimization
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.486
H-Index - 116
eISSN - 1095-7138
pISSN - 0363-0129
DOI - 10.1137/040620564
Subject(s) - rendezvous , correctness , asynchronous communication , multi agent system , synchronization (alternating current) , computer science , plane (geometry) , group (periodic table) , position (finance) , distributed computing , track (disk drive) , control (management) , mathematics , artificial intelligence , mathematical optimization , algorithm , engineering , computer network , spacecraft , aerospace engineering , channel (broadcasting) , chemistry , geometry , organic chemistry , finance , economics , operating system
This paper is concerned with the collective behavior of a group of $n1$ mobile autonomous agents, labelled $1$ through $n$, which can all move in the plane. Each agent is able to continuously track the positions of all other agents currently within its “sensing region,” where by an agent's sensing region we mean a closed disk of positive radius $r$ centered at the agent's current position. The multi-agent rendezvous problem is to devise “local” control strategies, one for each agent, which without any active communication between agents cause all members of the group to eventually rendezvous at a single unspecified location. This paper describes a family of unsynchronized strategies for solving the problem. Correctness is established appealing to the concept of “analytic synchronization.”
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