论文信息 - Minimum size transversals in uniform hypergraphs

Minimum size transversals in uniform hypergraphs

Abstract A set of vertices in a hypergraph which meets all the edges is called a transversal. The transversal number τ ( H ) of a hypergraph H is the minimum cardinality of a transversal in H . A classical greedy algorithm for constructing a transversal of small size selects in each step a vertex which has the largest degree in the hypergraph formed by the edges not met yet. The analysis of this algorithm (by Chvatal and McDiarmid (1992) [3] ) gave some upper bounds for τ ( H ) in a uniform hypergraph H with a given number of vertices and edges. We discuss a variation of this greedy algorithm. Analyzing this new algorithm, we obtain upper bounds for τ ( H ) which improve the bounds by Chvatal and McDiarmid.

Zbigniew Lonc | Karolina Warno

[1] Michael A. Henning,et al. A survey of selected recent results on total domination in graphs , 2009, Discret. Math..

[2] Colin McDiarmid,et al. Small transversals in hypergraphs , 1992, Comb..

[3] Noga Alon,et al. Transversal numbers of uniform hypergraphs , 1990, Graphs Comb..

[4] Csilla Bujtás,et al. Transversals and domination in uniform hypergraphs , 2012, Eur. J. Comb..

[5] Anders Yeo,et al. Total domination of graphs and small transversals of hypergraphs , 2007, Comb..

[6] Zsolt Tuza,et al. Covering all cliques of a graph , 1991, Discret. Math..

[7] Gerard J. Chang,et al. An upper bound for the transversal numbers of 4-uniform hypergraphs , 1990, J. Comb. Theory, Ser. B.