论文信息 - A Stability Theorem for Matchings in Tripartite 3-Graphs

A Stability Theorem for Matchings in Tripartite 3-Graphs

It follows from known results that every regular tripartite hypergraph of positive degree, with $n$ vertices in each class, has matching number at least $n/2$. This bound is best possible, and the extremal configuration is unique. Here we prove a stability version of this statement, establishing that every regular tripartite hypergraph with matching number at most $(1 + \varepsilon)n/2$ is close in structure to the extremal configuration, where "closeness" is measured by an explicit function of $\varepsilon$. We also answer a question of Aharoni, Kotlar and Ziv about matchings in hypergraphs with a more general degree condition.

Penny E. Haxell | Lothar Narins | P. Haxell | Lothar Narins

[1] E. Sperner. Neuer beweis für die invarianz der dimensionszahl und des gebietes , 1928 .

[2] Ron Aharoni,et al. Independent systems of representatives in weighted graphs , 2007, Comb..

[3] Michal Adamaszek,et al. On a lower bound for the connectivity of the independence complex of a graph , 2011, Discret. Math..

[4] Noga Alon,et al. On the Degree, Size, and Chromatic Index of a Uniform Hypergraph , 1997, J. Comb. Theory, Ser. A.

[5] Tibor Szabó,et al. Extremal hypergraphs for Ryser's Conjecture , 2018, J. Comb. Theory, Ser. A.

[6] Noga Alon,et al. Ramsey-nice families of graphs , 2018, Eur. J. Comb..

[7] Ron Aharoni,et al. The intersection of a matroid and a simplicial complex , 2006 .

[8] Ron Aharoni,et al. Hall's theorem for hypergraphs , 2000, J. Graph Theory.

[9] Roy Meshulam,et al. Domination numbers and homology , 2003, J. Comb. Theory A.

[10] Ron Aharoni,et al. Degree Conditions for Matchability in 3-Partite Hypergraphs , 2018, J. Graph Theory.

[11] Ron Aharoni. Ryser's Conjecture for Tripartite 3-Graphs , 2001, Comb..

[12] J. Milnor. Construction of Universal Bundles, II , 1956 .