k-Capture in multiagent pursuit evasion, or the lion and the hyenas

We consider the following generalization of the classical pursuit-evasion problem, which we call k-capture. A group of n pursuers (hyenas) wish to capture an evader (lion) who is free to move in an m-dimensional Euclidean space, the pursuers and the evader can move with the same maximum speed, and at least k pursuers must simultaneously reach the [email protected]?s location to capture it. If fewer than k pursuers reach the evader, then those pursuers get destroyed by the evader. Under what conditions can the evader be k-captured? We study this problem in the discrete time, continuous space model and prove that k-capture is possible if and only if there exists a time when the evader lies in the interior of the [email protected]? k-Hull. When the pursuit occurs inside a compact, convex subset of the Euclidean space, we show through an easy constructive strategy that k-capture is always possible.

[1]  Richard K. Guy Unsolved Problems in Combinatorial Games , 2009 .

[2]  Volkan Isler,et al.  The role of information in the cop-robber game , 2008, Theor. Comput. Sci..

[3]  Martin Aigner,et al.  A game of cops and robbers , 1984, Discret. Appl. Math..

[4]  Leonidas J. Guibas,et al.  A Visibility-Based Pursuit-Evasion Problem , 1999, Int. J. Comput. Geom. Appl..

[5]  Robert Ghrist,et al.  Capture pursuit games on unbounded domains , 2009 .

[6]  Edward M. Reingold,et al.  "Lion and Man": Upper and Lower Bounds , 1992, INFORMS J. Comput..

[7]  Volkan Isler,et al.  Bearing-only pursuit , 2008, 2008 IEEE International Conference on Robotics and Automation.

[8]  Bernd S. W. Schröder Upper and Lower Bounds , 2016 .

[9]  S. Bhogle,et al.  LITTLEWOOD'S MISCELLANY , 1990 .

[10]  T. D. Parsons,et al.  Pursuit-evasion in a graph , 1978 .

[11]  P. Varaiya,et al.  Differential games , 1971 .

[12]  Sampath Kannan,et al.  Randomized pursuit-evasion in a polygonal environment , 2005, IEEE Transactions on Robotics.

[13]  E. Helly Über Mengen konvexer Körper mit gemeinschaftlichen Punkte. , 1923 .

[14]  Subhash Suri,et al.  Robot kabaddi , 2010, CCCG.

[15]  Herbert Edelsbrunner,et al.  Algorithms in Combinatorial Geometry , 1987, EATCS Monographs in Theoretical Computer Science.

[16]  Jirí Sgall Solution of David Gale's lion and man problem , 2001, Theor. Comput. Sci..

[17]  Chinya V. Ravishankar,et al.  A framework for pursuit evasion games in Rn , 2005, Inf. Process. Lett..

[18]  Richard Cole,et al.  On k-hulls and related problems , 1984, STOC '84.

[19]  D. R. Lick,et al.  The Theory and Applications of Graphs. , 1983 .

[20]  João Pedro Hespanha,et al.  On Discrete-Time Pursuit-Evasion Games With Sensing Limitations , 2008, IEEE Transactions on Robotics.