Triple Correlations of Multiplicative Functions

Abstract

In this paper, we find asymptotic formula for the following sum with explicit error term: \[Mx(g1, g2, g3)=1xΣn xg1(F1(n))g2(F2(n))g3 (F3(n)),\] where F1(x), F2(x) and F3(x) are polynomials with integer coefficients and g1,g2,g3 are multilpicative functions with modulus less than or equal to 1. Moreover, under some assumption on g1,g2, we prove that as x→ ∞, \[1xΣn xg1(n+3)g2(n+2)μ(n+1)=o(1)\] and assuming 2-point Chowla type conjecture we show that as x→ ∞, \[1xΣn xg1(n+3)μ(n+2)μ(n+1)=o(1).\]