Independence and Matchings in $\sigma$-hypergraphs
Abstract
Let be a partition of the positive integer . A -hypergraph is an -uniform hypergraph on vertices which are partitioned into classes each containing vertices. An -subset of vertices is an edge of the hypergraph if the partition of formed by the non-zero cardinalities is . In earlier works we have considered colourings of the vertices of which are constrained such that any edge has at least and at most vertices of the same colour, and we have shown that interesting results can be obtained by varying and the parameters of appropriately. In this paper we continue to investigate the versatility of -hypergraphs by considering two classical problems: independence and matchings. We first demonstrate an interesting link between the constrained colourings described above and the -independence number of a hypergraph, that is, the largest cardinality of a subset of vertices of a hypergraph not containing vertices in the same edge. We also give an exact computation of the -independence number of the -hypergraph . We then present results on maximum, and sometimes perfect, matchings in . These results often depend on divisibility relations between the parameters of and on the highest common factor of the parts of .
Cite
@article{arxiv.1405.0107,
title = {Independence and Matchings in $\sigma$-hypergraphs},
author = {Yair Caro and Josef Lauri and Christina Zarb},
journal= {arXiv preprint arXiv:1405.0107},
year = {2014}
}