On the sum of the values of a polynomial at natural numbers which form a decreasing arithmetic progression
Abstract
The purpose of this paper consists to study the sums of the type P(n) + P(n - d) + P(n - 2 d) + …, where P is a real polynomial, d is a positive integer and the sum stops at the value of P at the smallest natural number of the form (n - k d) (k ∈ N). Precisely, for a given d, we characterize the R-vector space Ed constituting of the real polynomials P for which the above sum is polynomial in n. The case d = 2 is studied in more details. In the last part of the paper, we approach the problem through formal power series; this inspires us to generalize the spaces Ed and the underlying results. Also, it should be pointed out that the paper is motivated by the curious formula: n2 + (n - 2)2 + (n - 4)2 + … = n (n + 1) (n + 2)6, due to Ibn al-Banna al-Marrakushi (around 1290).
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