Correlation of multiplicative functions over function fields

Abstract

In this article we study the asymptotic behaviour of the correlation functions over polynomial ring Fq[x]. Let Mn, q and Pn, q be the set of all monic polynomials and monic irreducible polynomials of degree n over Fq respectively. For multiplicative functions 1 and 2 on Fq[x], we obtain asymptotic formula for the following correlation functions for a fixed q and n ∞ align* &S2(n, q):=Σf∈ Mn, q1(f+h1) 2(f+h2), \\ &R2(n, q):=ΣP∈ Pn, q1(P+h1)2(P+h2), align* where h1, h2 are fixed polynomials of degree <n over Fq. As a consequence, for real valued additive functions 1 and 2 on Fq[x] we show that for a fixed q and n ∞, the following distribution functions align* &1|Mn, q||\f∈ Mn, q : 1(f+h1)+2(f+h2)≤ x\|,\\ & 1|Pn, q||\P∈ Pn, q : 1(P+h1)+2(P+h2)≤ x\| align* converges weakly towards a limit distribution.