Title :
Path planning for multiple robots: An alternative duality approach
Author :
Motee, N. ; Jadbabaie, A. ; Pappas, G.
Author_Institution :
Control & Dynamical Syst. Dept., California Inst. of Technol., Pasadena, CA, USA
fDate :
June 30 2010-July 2 2010
Abstract :
We propose an optimization-based framework to find multiple fixed length paths for multiple robots that satisfy the following constraints: (i) bounded curvature, (ii) obstacle avoidance, (iii) and collision avoidance. By using polygonal approximation techniques, we show that path planning problem for multiple robots under various constraints and missions, such as curvature and obstacle avoidance constraints as well as rendezvous and maximal total area coverage, can be cast as a nonconvex optimization problem. Then, we propose an alternative dual formulation that results in no duality gap. We show that the alternative dual function can be interpreted as minimum potential energy of a multi-particle system with discontinuous spring-like forces. Finally, we show that using the proposed duality-based framework, an approximation of the minimal length path planning problem (also known as Dubins´ problem) in presence of obstacles can be solved efficiently using primal-dual interior-point methods.
Keywords :
collision avoidance; concave programming; multi-robot systems; alternative dual formulation; bounded curvature; collision avoidance; discontinuous spring-like force; minimal length path planning problem; multiparticle system; multiple fixed length path; multiple robot; nonconvex optimization; obstacle avoidance; polygonal approximation; Collision avoidance; Constraint optimization; Control systems; Kinematics; Orbital robotics; Path planning; Polynomials; Potential energy; Robot control; Shortest path problem;
Conference_Titel :
American Control Conference (ACC), 2010
Conference_Location :
Baltimore, MD
Print_ISBN :
978-1-4244-7426-4
DOI :
10.1109/ACC.2010.5531605
