On the divisibility of sums involving powers of multi-variable Schmidt polynomials
Abstract
The multi-variable Schmidt polynomials are defined by Sn(r)(x0,…,xn):=Σk=0n n+k 2kr2k k xk. We prove that, for any positive integers m, n, r, and = 1, all the coefficients in the polynomial Σk=0n-1k(2k+1) Sk(r)(x0,…,xk)m are multiples of n. This generalizes a recent result of Pan on the divisibility of sums of Ap\'ery polynomials.
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