The structure of logarithmically averaged correlations of multiplicative functions, with applications to the Chowla and Elliott conjectures

The structure of logarithmically averaged correlations of multiplicative functions, with applications to the Chowla and Elliott conjectures

Let $g_0,\dots,g_k: {\bf N} \to {\bf D}$ be $1$-bounded multiplicative functions, and let $h_0,\dots,h_k \in {\bf Z}$ be shifts. We consider correlation sequences $f: {\bf N} \to {\bf Z}$ of the form $$ f(a):= \widetilde{\lim}_{m \to \infty} \frac{1}{\log \omega_m} \sum_{x_m/\omega_m \leq n \leq x_m...

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Bibliographic Details
Main Authors:	Tao, T, Teräväinen, J
Format:	Journal article
Published:	Duke University Press 2019

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