Higher uniformity of arithmetic functions in short intervals I. All intervals

TL;DR

This paper investigates the higher uniformity properties of key arithmetic functions like the Möbius and von Mangoldt functions within short intervals, establishing new bounds and applications in number theory and ergodic theory.

Contribution

It introduces novel methods for analyzing uniformity of arithmetic functions in short intervals, including multi-parameter nilsequence equidistribution and hyperbola decomposition techniques.

Findings

Proves asymptotic smallness of Gowers norms for these functions in short intervals.

Establishes asymptotic formulas for solutions to linear equations in primes within short intervals.

Shows convergence of multiple ergodic averages along primes in short intervals.

Abstract

We study higher uniformity properties of the M\"obius function $\mu$, the von Mangoldt function $\Lambda$, and the divisor functions $d_k$ on short intervals $(X,X+H]$ with $X^{\theta+\varepsilon} \leq H \leq X^{1-\varepsilon}$ for a fixed constant $0 \leq \theta < 1$ and any $\varepsilon>0$. More precisely, letting $\Lambda^\sharp$ and $d_k^\sharp$ be suitable approximants of $\Lambda$ and $d_k$ and $\mu^\sharp = 0$, we show for instance that, for any nilsequence $F(g(n)\Gamma)$, we have \[ \sum_{X < n \leq X+H} (f(n)-f^\sharp(n)) F(g(n) \Gamma) \ll H \log^{-A} X \] when $\theta = 5/8$ and $f \in \{\Lambda, \mu, d_k\}$ or $\theta = 1/3$ and $f = d_2$. As a consequence, we show that the short interval Gowers norms $\|f-f^\sharp\|_{U^s(X,X+H]}$ are also asymptotically small for any fixed $s$ for these choices of $f,\theta$. As applications, we prove an asymptotic formula for the number of solutions to linear equations in primes in short intervals, and show that multiple ergodic averages along primes in short intervals converge in $L^2$. Our innovations include the use of multi-parameter nilsequence equidistribution theorems to control type $II$ sums, and an elementary decomposition of the neighbourhood of a hyperbola into arithmetic progressions to control type $I_2$ sums.