Congruences for sums involving rkk
Abstract
We primarily investigate congruences modulo p for finite sums of the form Σkrkkxk/k over the ranges 0<k<p and 0<k<p/r, where p is a prime larger than the positive integer r. Here x is an indeterminate, thus allowing specialization to numerical congruences where x takes certain algebraic numbers as values. We employ two different approaches that have complementary strengths. In particular, we obtain congruences modulo p2 for the sum Σ0<k<prkkxk, expressed in terms of finite polylogarithms of certain quantities related to x.
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