On a conjectural supercongruence involving the dual sequence sn(x)
Abstract
In 2017, motivated by a supercongruence conjectured by Kimoto and Wakayama and confirmed by Long, Osburn and Swisher, Z.-W. Sun introduced the sequence of polynomials: sn(x)=Σk=0nnkxkx+kk=Σk=0nnk(-1)kxk-1-xk and investigated its congruence properties. In particular, Z.-W. Sun conjectured that for any prime p>3 and p-adic integer x≠-1/2 one has equation* Σn=0p-1sn(x)2 (-1) xpp+2(x- xp)2x+1p3, equation* where xp denotes the least nonnegative residue of x modulo p. In this paper, we confirm this conjecture.
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