Multiplicative functions in short intervals II

TL;DR

This paper investigates the behavior of multiplicative functions in short intervals, establishing power-saving bounds that improve understanding of their distribution and applications in number theory, including sums of two squares and gaps between smooth numbers.

Contribution

It provides new power-saving bounds for multiplicative functions in short intervals, extending results to general number fields and improving existing bounds on sums and gaps.

Findings

Power-saving bounds for multiplicative functions in short intervals.

Asymptotic formulas for sums of two squares in almost all short intervals.

Results on gaps between smooth numbers and multiplicative sequences.

Abstract

We determine the behavior of multiplicative functions vanishing at a positive proportion of prime numbers in almost all short intervals. Furthermore we quantify "almost all" with uniform power-saving upper bounds, that is, we save a power of the suitably normalized length of the interval regardless of how long or short the interval is. Such power-saving bounds are new even in the special case of the M\"obius function. These general results are motivated by several applications. First, we strengthen work of Hooley on sums of two squares by establishing an asymptotic for the number of integers that are sums of two squares in almost all short intervals. Previously only the order of magnitude was known. Secondly, we extend this result to general norm forms of an arbitrary number field $K$ (sums of two squares are norm-forms of $\mathbb{Q}(i)$). Thirdly, Hooley determined the order of magnitude of the sum of $(s_{n + 1} - s_{n})^{\gamma}$ with $\gamma \in (1, 5/3)$ where $s_{1} < s_2 < \ldots$ denote integers representable as sums of two squares. We establish a similar results with $\gamma \in (1, 3/2)$ and $s_n$ the sequence of integers representable as norm-forms of an arbitrary number field $K$. This is the first such result for a number field of degree greater than two. Assuming the Riemann Hypothesis for all Hecke $L$-functions we also show that $\gamma \in (1,2)$ is admissible. Fourthly, we improve on a recent result of Heath-Brown about gaps between $x^{\varepsilon}$-smooth numbers. More generally, we obtain results about gaps between multiplicative sequences. Finally our result is useful in other contexts aswell, for instance in our forthcoming work on Fourier uniformity (joint with Terence Tao, Joni Terav\"ainen and Tamar Ziegler).