On the p-integrality of A-hypergeometric series
Abstract
Let A be a set of N vectors in Zn and let v be a vector in CN that has minimal negative support for A. Such a vector v gives rise to a formal series solution of the A-hypergeometric system with parameter β = Av. If v lies in Qn, then this series has rational coefficients. Let p be a prime number. We characterize those v whose coordinates are rational, p-integral, and lie in the closed interval [-1,0] for which the corresponding normalized series solution has p-integral coefficients.
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