On Elliott's conjecture and applications

Abstract

Let f:N D be a multiplicative function. Under the merely necessary assumption that f is non-pretentious (in the sense of Granville and Soundararajan), we show that for any pair of distinct integer shifts h1,h2 the two-point correlation 1xΣn≤ xf(n+h1)f(n+h2) tends to 0 along a set of x∈N of full upper logarithmic density. We also show that the same result holds for the k-point correlations 1xΣn≤ xf(n+h1)·s f(n+hk) if k is odd and f is a real-valued non-pretentious function. Previously, the vanishing of correlations was known only under stronger non-pretentiousness hypotheses on f by the works of Tao, and Tao and the third author. We derive several applications, including: (i) A classification of 1-valued completely multiplicative functions that omit a length four sign pattern, solving a 1974 conjecture of R.H. Hudson. (ii) A proof that a class of "Liouville-like" functions satisfies the unweighted Elliott conjecture of all orders, solving a problem of de la Rue. (iii) Constructing examples of multiplicative f:N \-1,0,1\ with a given (unique) Furstenberg system, answering a question of Lema\'nczyk. (iv) A density version of the Erdos discrepancy theorem of Tao.