Abstract:
We consider relatives of the Vinogradov system of equations in which one or more
equations have been deleted. In particular, when $k\geqslant 4$ and $0\leqslant d\leqslant (k-2)/4$,
we consider the system of Diophantine equations
$$
x_1^j+\ldots +x_k^j=y_1^j+\ldots +y_k^j\quad (1\leqslant j\leqslant k,\, j\ne k-d).
$$
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 $d=o(k^{1/4})$.
Analogous systems with more than one deleted equation will be discussed should time permit.
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