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

Abstract

Let g0,…,gk: N D be 1-bounded multiplicative functions, and let h0,…,hk ∈ Z be shifts. We consider correlation sequences f: N Z of the form f(a):= m ∞ 1 ωm Σxm/ωm ≤ n ≤ xm g0(n+ah0) … gk(n+ahk)n where 1 ≤ ωm ≤ xm are numbers going to infinity as m ∞, and is a generalised limit functional extending the usual limit functional. We show a structural theorem for these sequences, namely that these sequences f are the uniform limit of periodic sequences fi. Furthermore, if the multiplicative function g0 … gk "weakly pretends" to be a Dirichlet character , the periodic functions fi can be chosen to be -isotypic in the sense that fi(ab) = fi(a) (b) whenever b is coprime to the periods of fi and , while if g0 … gk does not weakly pretend to be any Dirichlet character, then f must vanish identically. As a consequence, we obtain several new cases of the logarithmically averaged Elliott conjecture, including the logarithmically averaged Chowla conjecture for odd order correlations. We give a number of applications of these special cases, including the conjectured logarithmic density of all sign patterns of the Liouville function of length up to three, and of the M\"obius function of length up to four.