论文信息 - Parity Systems and the Delta-Matroid Intersection Problem

Parity Systems and the Delta-Matroid Intersection Problem

We consider the problem of determining when two delta-matroids on the same ground-set have a common base. Our approach is to adapt the theory of matchings in 2-polymatroids developed by Lovasz $[13]$ to a new abstract system, which we call a parity system. Examples of parity systems may be obtained by combining either, two delta-matroids, or two orthogonal 2-polymatroids, on the same ground-sets. We show that many of the results of Lovasz concerning 'double flowers' and 'projections' carry over to parity systems.

Bill Jackson | André Bouchet | A. Bouchet | B. Jackson

[1] André Bouchet,et al. Coverings and Delta-Coverings , 1995, IPCO.

[2] László Lovász,et al. Matroid matching and some applications , 1980, J. Comb. Theory, Ser. B.

[3] André Bouchet,et al. Multimatroids I. Coverings by Independent Sets , 1997, SIAM J. Discret. Math..

[4] André Bouchet,et al. Multimatroids II. Orthogonality, minors and connectivity , 1997, Electron. J. Comb..

[5] Refael Hassin,et al. Minimum cost flow with set-constraints , 1982, Networks.

[6] Harold N. Gabow,et al. An augmenting path algorithm for linear matroid parity , 1986, Comb..

[7] Bill Jackson,et al. Orthogonal A-Trails of 4-Regular Graphs Embedded in Surfaces of Low Genus , 1996, J. Comb. Theory, Ser. B.

[8] András Frank,et al. Generalized polymatroids and submodular flows , 1988, Math. Program..

[9] André Bouchet,et al. Unimodularity and circle graphs , 1987, Discret. Math..

[10] K. Lempert,et al. CONDENSED 1,3,5-TRIAZEPINES - IV THE SYNTHESIS OF 2,3-DIHYDRO-1H-IMIDAZO-[1,2-a] [1,3,5] BENZOTRIAZEPINES , 1983 .