On the average number of representations of an integer as a sum of polynomials computed at prime values
Abstract
We study the average number of representations of an integer n as n = ϕ(n1) + … + ϕ(nj), for polynomials ϕ∈ Z[n] with ∂ϕ= k 1, lead(ϕ) = 1, j k, where ni is a prime power for each i ∈ \1, …, j\. We extend the results of Languasco and Zaccagnini (2019), for k=3 and j=4, and of Cantarini, Gambini and Zaccagnini (2020), where they focused on monomials ϕ(n) = nk, k 2 and j=k, k + 1.
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