Paucity problems and some relatives of Vinogradov's mean value theorem
Abstract
When k 4 and 0 d (k-2)/4, we consider the system of Diophantine equations \[ x1j+… +xkj=y1j+… +ykj (1 j k,\, j k-d). \] We show that in this cousin of a Vinogradov system, there is a paucity of non-diagonal positive integral solutions. Our quantitative estimates are particularly sharp when d=o(k1/4).
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