Weyl's inequality (number theory)

In number theory, Weyl's inequality, named for Hermann Weyl, states that if M, N, a and q are integers, with a and q coprime, q > 0, and f is a real polynomial of degree k whose leading coefficient c satisfies

${\displaystyle |c-a/q|\le t{q}^{-2},}$

for some t greater than or equal to 1, then for any positive real number ${\displaystyle \epsilon }$ one has

${\displaystyle {\displaystyle \sum _{x=M}^{M+N}}\exp (2\pi if(x))=O\left(N^{1+\epsilon }{(\frac{t}{q}+\frac{1}{N}+\frac{t}{N^{k-1}}+\frac{q}{N^k})}^{2^{1-k}}\right)\text{ as }N\to \mathrm{\infty }.}$

This inequality will only be useful when

${\displaystyle q<N^k,}$

for otherwise estimating the modulus of the exponential sum by means of the triangle inequality as ${\displaystyle \le N}$ provides a better bound.

• Vinogradov, Ivan Matveevich (1954). The method of trigonometrical sums in the theory of numbers. Translated, revised and annotated by K. F. Roth and Anne Davenport, New York: Interscience Publishers Inc. X, 180 p.
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