Best laid plans of lions and men
Publikation: Bidrag til bog/antologi/rapport › Konferencebidrag i proceedings › Forskning › fagfællebedømt
Dokumenter
- Abrahamsen_2017_Best_laid_plans
Forlagets udgivne version, 616 KB, PDF-dokument
We answer the following question dating back to J. E. Littlewood (1885-1977): Can two lions catch a man in a bounded area with rectifiable lakes? The lions and the man are all assumed to be points moving with at most unit speed. That the lakes are rectifiable means that their boundaries are finitely long. This requirement is to avoid pathological examples where the man survives forever because any path to the lions is infinitely long. We show that the answer to the question is not always "yes" by giving an example of a region R in the plane where the man has a strategy to survive forever. R is a polygonal region with holes and the exterior and interior boundaries are pairwise disjoint, simple polygons. Our construction is the first truly two-dimensional example where the man can survive. Next, we consider the following game played on the entire plane instead of a bounded area: There is any finite number of unit speed lions and one fast man who can run with speed 1 + ϵ for some value ϵ > 0. Can the man always survive? We answer the question in the affirmative for any constant ϵ > 0.
Originalsprog | Engelsk |
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Titel | 33rd International Symposium on Computational Geometry (SoCG 2017) |
Redaktører | Boris Aronov, Matthew J. Katz |
Antal sider | 16 |
Forlag | Schloss Dagstuhl - Leibniz-Zentrum für Informatik |
Publikationsdato | 2017 |
Artikelnummer | 6 |
ISBN (Elektronisk) | 978-3-95977-038-5 |
DOI | |
Status | Udgivet - 2017 |
Begivenhed | 33rd International Symposium on Computational Geometry - Brisbane, Australien Varighed: 4 jul. 2017 → 7 jul. 2017 Konferencens nummer: 33 |
Konference
Konference | 33rd International Symposium on Computational Geometry |
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Nummer | 33 |
Land | Australien |
By | Brisbane |
Periode | 04/07/2017 → 07/07/2017 |
Navn | Leibniz International Proceedings in Informatics |
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Vol/bind | 77 |
ISSN | 1868-8969 |
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