Strong games played on random graphs

• dc.contributor.author: Ferber, Asaf
• dc.contributor.author: Pfister, Pascal
• dc.date.issued: 2017-02
• dc.date.submitted: 2015-07
• dc.identifier.issn: 1077-8926
• dc.identifier.issn: 1097-1440
• dc.identifier.uri: http://hdl.handle.net/1721.1/110013
• dc.description.abstract: In a strong game played on the edge set of a graph G there are two players, Red and Blue, alternating turns in claiming previously unclaimed edges of G (with Red playing first). The winner is the first one to claim all the edges of some target structure (such as a clique K[subscript k], a perfect matching, a Hamilton cycle, etc.). In this paper we consider strong games played on the edge set of a random graph G ∼ G(n, p) on n vertices. We prove that G ∼ G(n, p) is typically such that Red can win the perfect matching game played on E(G), provided that p ∈ (0, 1) is a fixed constant.
• dc.language.iso: en_US
• dc.publisher: European Mathematical Information Service (EMIS)
• dc.relation.isversionof: http://www.combinatorics.org/ojs/index.php/eljc/article/view/v24i1p35/pdf
• dc.source: Electronic Journal of Combinatorics
• dc.type: Article
• dc.identifier.citation: Ferber, Asaf and Pascal Pfister. "Strong games played on random graphs." The Electronic Journal of Combinatorics 24.1 (2017): n. pag.
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.contributor.mitauthor: Ferber, Asaf
• dc.relation.journal: Electronic Journal of Combinatorics
• dc.eprint.version: Final published version