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Correlation function of Schur process with application to local geometry of a random 3-dimensional Young diagram

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abstract

Schur process is a time-dependent analog of the Schur measure on partitions studied in math.RT/9907127. Our first result is that the correlation functions of the Schur process are determinants with a kernel that has a nice contour integral representation in terms of the parameters of the process. This general result is then applied to a particular specialization of the Schur process, namely to random 3-dimensional Young diagrams. The local geometry of a large random 3-dimensional diagram is described in terms of a determinantal point process on a 2-dimensional lattice with the incomplete beta function kernel (which generalizes the discrete sine kernel). A brief discussion of the universality of this answer concludes the paper.

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math.PR 1

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2026 1

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A Two-Color Lift of the Shifted $t$-Schur Measure

math.PR · 2026-07-02 · unverdicted · novelty 6.0

Introduces a two-color lift of the shifted Schur measure on pairs of partitions and derives its normalization, marginals, transition kernel, and independence of color volumes.

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  • A Two-Color Lift of the Shifted $t$-Schur Measure math.PR · 2026-07-02 · unverdicted · none · ref 8 · internal anchor

    Introduces a two-color lift of the shifted Schur measure on pairs of partitions and derives its normalization, marginals, transition kernel, and independence of color volumes.