Invariant covers of multipartite hypergraphs

Anton A. Klyachko; Mikhail S. Terekhov

Invariant covers of multipartite hypergraphs

Anton A. Klyachko, Mikhail S. Terekhov

Abstract

We prove the following ``symmetric analogue'' of Lovász's estimate (1975): if an $r$-partite hypergraph of rank $r\geqslant2$ has a cover of cardinality $n<\infty$, then it admits a cover of cardinality at most $nr/2$, which is invariant with respect to all automorphisms preserving the parts. We obtain also symmetric analogues of generalisations of Lovász's estimate due to Aharoni, Holzman, and Krivelevich (1996).

Invariant covers of multipartite hypergraphs

Abstract

We prove the following ``symmetric analogue'' of Lovász's estimate (1975): if an

-partite hypergraph of rank

has a cover of cardinality

, then it admits a cover of cardinality at most

, which is invariant with respect to all automorphisms preserving the parts. We obtain also symmetric analogues of generalisations of Lovász's estimate due to Aharoni, Holzman, and Krivelevich (1996).

Paper Structure (5 equations)

This paper contains 5 equations.