On the inhomogeneous Vinogradov system
Abstract
We show that the system of equations align* Σi=1s (xij-yij) = aj (1 j k) align* has appreciably fewer solutions in the subcritical range s < k(k+1)/2 than its homogeneous counterpart, provided that a ≠ 0 for some k-1. Our methods use Vinogradov's mean value theorem in combination with a shifting argument.
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