Abstract
If D = (V, A) is a digraph, its competition hypergraph \(C {\mathcal H}(D)\) has vertex set V and \(e {\subseteq} V\) is an edge of \(C {\mathcal H} (D)\) iff \(|e| {\geq} 2\) and there is a vertex \(v {\in} V\) , such that e = {w ∈ V|(w, v) ∈ A}. For several products D 1 ∘ D 2 of digraphs D 1 and D 2, we investigate the relations between the competition hypergraphs of the factors D 1, D 2 and the competition hypergraph of their product D 1 ∘ D 2.
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Sonntag, M., Teichert, HM. Competition Hypergraphs of Products of Digraphs. Graphs and Combinatorics 25, 611–624 (2009). https://doi.org/10.1007/s00373-005-0868-9
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DOI: https://doi.org/10.1007/s00373-005-0868-9