Transversals and blocking sets in H(3)-designs
DOI:
https://doi.org/10.1478/AAPP.96S2A3Keywords:
Transversals, Blocking sets, HypergraphsAbstract
If H(h) is a subhypergraph of order n of Kv(h), the complete and h-uniform hypergraph of order v, an H(h)-decomposition of Kv(h), also called an H(h)-design of order v, is a pair Σ=(X,B), where B is a partition of the edge-set of Kv(h) into classes generating hypergraphs all isomorphic to H(h). The classes of the partition B are said to be the blocks of Σ. Using hypergraph terminology, if Σ=(X,B) is an H(h)-design, a transversal T of Σ is a subset of X intersecting every block of Σ. The transversal number of Σ is the minimum number τ(Σ)=τ for which there exists a transversal of Σ having cardinality τ. A blocking set B of Σ is a subset of X such that both B and CX(B) are transversals. In this paper, the existence of transversals and blocking sets in H(3)-designs are studied.Downloads
Published
2018-11-20
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Section
HyGraDe 2017 (Conference Proceedings)
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