Zbl.No: 242.05113
Autor: Erdös, Paul; Hajnal, András; Milner, E.C.
Title: Simple one-point extensions of tournaments. (In English)
Source: Mathematika, Lond. 19, 57-62 (1972).
Review: A tournament T consists of a set of points on which is defined a complete, anti-symmetric, irreflexive binary relation \rho. A tournament T is simple if it is impossible to define a non-trivial equivalence relation on the points of T with the property that if x \rho y then x' \rho y' for all pairs of points x' and y' that are equivlent to x and y, respectively. If T is a subtournament of T' and |T' - T| = k then T' is a k-point extension of T. The authors prove that s (finite or infinite) tournament T has a simple 1-point extension except when T is a 3-cycle of a non-trivial finite transitive tournament with an odd number of points.
Reviewer: J.W.Moon
Classif.: * 05C20 Directed graphs (digraphs)
