Looms
Abstract
A pair (A,B) of hypergraphs is called orthogonal if |a b|=1 for every pair of edges a ∈ A and b ∈ B. An orthogonal pair of hypergraphs is called a loom if each of its two members is the set of minimum covers of the other. Looms appear naturally in the context of a conjecture of Gy\'arf\'as and Lehel on the covering number of cross-intersecting hypergraphs. We study their properties and ways of construction, and prove special cases of a conjecture that if true would imply the Gy\'arf\'as--Lehel conjecture.
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