Tournament completions of bipartite tournaments and their augmented directed cycles
Abstract
A tournament T is a tournament completion of a bipartite tournament D if D is a spanning subdigraph of T, i.e., V(D)=V(T) and A(D)⊂eq A(T). If C is a k-dicycle (i.e., directed cycle of length k) in a tournament completion T of D and C is not a dicycle in D, i.e., A(C)⊂eq A(T) and A(C)⊂eq A(D), then we call C an augmented k-dicycle of T. In this paper, we investigate the families of bipartite tournaments for which there exists a tournament completion with exactly one augmented 3-dicycle and with no augmented 4-dicycles. Our investigation may be viewed as a variant of the orientation completion problem initiated by Bang-Jensen et al..
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