Hall-Littlewood polynomials, boundaries, and p-adic random matrices
Abstract
We prove that the boundary of the Hall-Littlewood t-deformation of the Gelfand-Tsetlin graph is parametrized by infinite integer signatures, extending results of Gorin and Cuenca on boundaries of related deformed Gelfand-Tsetlin graphs. In the special case when 1/t is a prime p we use this to recover results of Bufetov-Qiu and Assiotis on infinite p-adic random matrices, placing them in the general context of branching graphs derived from symmetric functions. Our methods rely on explicit formulas for certain skew Hall-Littlewood polynomials. As a separate corollary to these, we obtain a simple expression for the joint distribution of the cokernels of products A1, A2A1, A3A2A1,… of independent Haar-distributed matrices Ai over the p-adic integers Zp. This expression generalizes the explicit formula for the classical Cohen-Lenstra measure on abelian p-groups.
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