2-covers of wide Young diagrams

Abstract

A Young diagram Y is called wide if every sub-diagram Z formed by a subset of the rows of Y dominates Z', the conjugate of Z. A Young diagram Y is called Latin if its squares can be assigned numbers so that for each i, the ith row is filled injectively with the numbers 1, … ,ai, where ai is the length of ith row of Y, and every column is also filled injectively. A conjecture of Chow and Taylor, publicized by Chow, Fan, Goemans, and Vondrak is that a wide Young diagram is Latin. We prove a dual version of the conjecture.

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