A local-global theorem for p-adic supercongruences
Abstract
Let Zp denote the ring of all p-adic integers and call U=\(x1,…,xn):\,a1x1+…+anxn+b=0\ a hyperplane over Zpn, where at least one of a1,…,an is not divisible by p. We prove that if a sufficiently regular n-variable function is zero modulo pr over some suitable collection of r hyperplanes, then it is zero modulo pr over the whole Zpn. We provide various applications of this general criterion by establishing several p-adic analogues of hypergeometric identities.
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