On p-adic congruences involving d

Abstract

Let p be an odd prime and let d be an integer not divisible by p. We prove that Π1 m,n p-1 p m2-dn2\ (x-(m+nd)) casesΣk=1p-2k(k+1)2x(k-1)(p-1) p &if\ ( dp)=1,\\Σk=0(p-1)/2x2k(p-1) p& if\ ( dp)=-1, cases where ( dp) denotes the Legendre symbol. This extends a recent conjecture of N. Kalinin. We also obtain the Wolstenholme-type congruence Σ1 m,n p-1 p m2-dn2\ \ 1m+n d0p2.

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