On integers as the sum of a prime and a k-th power
Abstract
Let Rk(n) be the number of representations of an integer n as the sum of a prime and a k-th power. Define Ek(X) := |\n X, n ∈ Ik, nnot a sum of a prime and a k-th power\|. Hardy and Littlewood conjectured that for k = 2 and k=3, Ek(X) k 1. In this note we present an alternative approach grounded in the theory of Diophantine equations towards a proof of the conjecture for all k 2.
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