p-adic supercongruences conjectured by Sun
Abstract
In this paper we prove three results conjectured by Z.-W. Sun. Let p be an odd prime and let h∈ Z with 2h-10p. For a∈Z+ and pa>3, we show that align Σk=0pa-1hpa-1k2kk(-h2)k0pa+1. align Also, for any n∈ Z+ we have align p(Σk=0n-1hn-1k2kk(-h2)k)≥p(n), align where p(n) denotes the p-adic order of n. For any integer m 0p and positive integer n, we have align* 1pn(Σk=0pn-1pn-1k2kk(-m)k-(m(m-4)p)Σk=0n-1n-1k2kk(-m)k)∈ Zp, align* where (.) is the Legendre symbol and Zp is the ring of p-adic integers.
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