Structure and paucity in affine diagonal systems, I
Abstract
Let >0 and h∈ Z3. We show that whenever P is large and the system \[ x1j+x2j-y1j-y2j=hj (j=1,2,3) \] has more than P integral solutions with 1 xi,yi P, then there exist natural numbers a and b with hj=aj-bj (j=1,2,3). This example illustrates the theme that, either the Diophantine system has a paucity of integral solutions, or else the coefficient tuple h is highly structured. We examine related paucity problems as well as some consequences for problems involving more variables.
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