The Aharoni--Korman conjecture for posets whose incomparability graph is locally finite
Abstract
Aharoni and Korman (Order 9 (1992) 245--253) have conjectured that every ordered set without infinite antichains possesses a chain and a partition into antichains so that each part intersects the chain. The conjecture is verified for posets whose incomparability graph is locally finite. It follows that the conjecture is true for (3 + 1)-free posets with no infinite antichains.
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