Moments of the number of representations as sums of two prime squares

Abstract

We prove, for every fixed integer k 4, the correct order of magnitude for the kth moments of the function that counts the number of representations of an integer as sums of two prime squares. The upper bound for k=4 was previously known up to x, and the lower bound for k 4 was only known conditionally on a conjectural uniform version of the Green-Tao theorem on linear equations in primes by the work of Sabuncu Sabuncu2024. As an application of our method, we give a simpler proof of the lower bounds for the moments of the shifted prime divisor function, thereby recovering the lower-bound part of Gabdullin's recent result on a conjecture of Fan and Pomerance.

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