Additive representation in short intervals, II: sums of two like powers
Abstract
We establish that, for almost all natural numbers N, there is a sum of two positive integral cubes lying in the interval [N-N7/18+ε,N]. Here, the exponent 7/18 lies half way between the trivial exponent 4/9 stemming from the greedy algorithm, and the exponent 1/3 constrained by the number of integers not exceeding X that can be represented as the sum of two positive integral cubes. We also provide analogous conclusions for sums of two positive integral k-th powers when k 4.
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