Effective Asymptotic Formulae for Multilinear Averages of Multiplicative Functions

Abstract

Let f1,…,fk : N → C be multiplicative functions taking values in the closed unit disc. Using an analytic approach in the spirit of Hal\'asz' mean value theorem, we compute multidimensional averages of the shape x-l Σn ∈ [x]l Π1 ≤ j ≤ k fj(Lj(n)) as x → ∞, where [x] := [1,x] and L1,…, Lk are affine linear forms that satisfy some natural conditions. Our approach gives a new proof of a result of Frantzikinakis and Host that is distinct from theirs, with explicit main and error terms. \\ As an application of our formulae, we establish a local-to-global principle for Gowers norms of multiplicative functions. We also compute the asymptotic densities of the sets of integers n such that a given multiplicative function f: N → \-1, 1\ yields a fixed sign pattern of length 3 or 4 on almost all 3- and 4-term arithmetic progressions, respectively, with first term n.