Lion and Man -- Can Both Win?
Abstract
This paper is concerned with continuous-time pursuit and evasion games. Typically, we have a lion and a man in a metric space: they have the same speed, and the lion wishes to catch the man while the man tries to evade capture. We are interested in questions of the following form: is it the case that exactly one of the man and the lion has a winning strategy? As we shall see, in a compact metric space at least one of the players has a winning strategy. We show that, perhaps surprisingly, there are examples in which both players have winning strategies. We also construct a metric space in which, for the game with two lions versus one man, neither player has a winning strategy. We prove various other (positive and negative) related results, and pose some open problems.
Cite
@article{arxiv.0909.2524,
title = {Lion and Man -- Can Both Win?},
author = {B. Bollobás and I. Leader and M. Walters},
journal= {arXiv preprint arXiv:0909.2524},
year = {2009}
}
Comments
24 pages