Kloosterman Sums with Multiplicative Coefficients
Abstract
Let f(n) be a multiplicative function satisfying |f(n)|≤ 1, q (≤ N2) be a positive integer and a be an integer with (a,\,q)=1. In this paper, we shall prove that Σn≤ N\\ (n,\,q)=1f(n)e(an q)τ(q) qN(6N)+q1 4+ε 2N1 2((6N))1 2+N (6N), where n is the multiplicative inverse of n such that nn 1\,( mod\,q),\,e(x)=(2π ix),\,τ(q) is the divisor function.
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