Open AccessOn a conjecture of Quintas and arc-traceability in upset tournaments
Author(s) -
Arthur H. Bush,
Michael S. Jacobson,
K. B. Reid
Publication year - 2005
Publication title -
discussiones mathematicae graph theory
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.476
H-Index - 19
eISSN - 2083-5892
pISSN - 1234-3099
DOI - 10.7151/dmgt.1287
Subject(s) - upset , mathematics , tournament , conjecture , arc (geometry) , combinatorics , traceability , discrete mathematics , statistics , geometry
A digraph D = (V, A) is arc-traceable if for each arc xy in A, xy lies on a directed path containing all the vertices of V , i.e., hamiltonian path. We prove a conjecture of Quintas [7]: if D is arc-traceable, then the condensation of D is a directed path. We show that the converse of this conjecture is false by providing an example of an upset tournament which is not arc-traceable. We then give a characterization for upset tournaments in terms of their score sequences, characterize which arcs of an upset tournament lie on a hamiltonian path, and deduce a characterization of arc-traceable upset tournaments.
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