Counterexample to a conjecture of Aharoni and Korman
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aharonicounterexamplekormanconjectureconjecturedcoveredgesfinite
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Ron Aharoni and Vladimir Korman conjectured that any hypergraph with only finite edges has a strongly minimal cover. We present a counterexample.
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Cited by 1 Pith paper
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The structure of FAC posets and the Aharoni--Korman conjecture
Proves the Aharoni-Korman conjecture for countable FAC posets without saturated chains of the form ⊕_{x∈ω} D_x (D_x infinite and co-wellfounded), via decomposition into scattered posets.
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