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Extreme rays of the $(N, k)$-Schur Cone

We discuss several partial results towards proving Dennis White's conjecture on the extreme rays of the $(N,2)$-Schur cone. We are interested in which vectors are extreme in the cone generated by all products of Schur functions of partitions with $k$ or fewer parts. For the case where $k =2$, White conjectured that the extreme rays are obtained by excluding a certain family of "bad pairs," and proved a special case of the conjecture using Farkas' Lemma. We present an alternate proof of the special case, in addition to showing more infinite families of extreme rays and reducing White's conjecture to two simpler conjectures.

preprint2016arXivOpen access
Christian GaetzKyle MeyerKa Yu TamMax WimberleyZijian YaoHeyi Zhu
math.CO
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Christian GaetzKyle MeyerKa Yu TamMax WimberleyZijian YaoHeyi Zhu

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