Consider $$S_N:=\sum_{n=1}^N \exp\left(2\pi i\left(\frac12n^2x+\alpha n\right)\right)$$
where $\alpha$ is irrational. For certain $x$ (say integer) we can get that this is bounded for all $N$. I am curious, for what $x\in \mathbb R$ is this sum "small" - that is $S_N=o(\sqrt N)$?
Is the Lebesgue measure of such $x$ positive?
Ok, apologies if this is overkill, but this paper shows that for almost every (irrational) $\alpha \in \mathbb{R}$, only a measure $0$ set of $x \in \mathbb{R}$ satisfy $S_{N,\alpha}(x) = o(\sqrt{N})$ as $N \to \infty$.
Indeed, that paper,
Metric theory of Weyl sums
Changhao Chen, Bryce Kerr, James Maynard, Igor Shparlinski
shows that there is an absolute constant $c > 0$ such that almost every pair $(x,\alpha) \in \mathbb{R}^2$ has $|S_{N,\alpha}(x)| \ge c\sqrt{N}$ for infinitely many $N$. It follows from basic measure theory that for almost every $\alpha \in \mathbb{R}$, it holds for almost every $x \in \mathbb{R}$ that $|S_{N,\alpha}(x)| \ge c\sqrt{N}$ for infinitely many $N$.
