Smooth numbers are orthogonal to nilsequences
Abstract
The aim of this paper is to study distributional properties of integers without large or small prime factors. Define an integer to be [y',y]-smooth if all of its prime factors belong to the interval [y',y]. We identify suitable weights g[y',y](n) for the characteristic function of [y',y]-smooth numbers that allow us to establish strong asymptotic results on their distribution in short arithmetic progressions. Building on these equidistribution properties, we show that (a W-tricked version of) the function g[y',y](n) - 1 is orthogonal to nilsequences. Our results apply in the almost optimal range ( N)K < y ≤ N of the smoothness parameter y, where K ≥ 2 is sufficiently large, and to any y' < (y, ( N)c). As a first application, we establish for any y> N1/9 N asymptotic results on the frequency with which an arbitrary finite complexity system of shifted linear forms j (n) + aj ∈ Z[n1, …, ns], 1 ≤ j ≤ r, simultaneously takes [y',y]-smooth values as the ni vary over integers below N.
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