Transitive closure and transitive reduction in bidirected graphs
Transitive closure and transitive reduction in bidirected graphs
In a bidirected graph an edge has a direction at each end, so bidirected graphs generalize directed graphs. We generalize the definitions of transitive closure and transitive reduction from directed graphs to bidirected graphs by introducing new notions of bipath and bicircuit that generalize directed paths and cycles. We show how transitive reduction is related to transitive closure and to the matroids of the signed graph corresponding to the bidirected graph.
22 pp., 10 fig. V2: 23 pp. Improved presentation, notation, terminology
- University of Sciences and Technology Houari Boumediene Algeria
- Binghamton University United States
Directed graphs (digraphs), tournaments, bidirected graph, Signed and weighted graphs, signed graph, transitive reduction, transitive closure, FOS: Mathematics, matroid, Mathematics - Combinatorics, Combinatorics (math.CO), Paths and cycles, 05C22 (Primary), 05C20, 05C38 (Secondary)
Directed graphs (digraphs), tournaments, bidirected graph, Signed and weighted graphs, signed graph, transitive reduction, transitive closure, FOS: Mathematics, matroid, Mathematics - Combinatorics, Combinatorics (math.CO), Paths and cycles, 05C22 (Primary), 05C20, 05C38 (Secondary)
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