Omega Theorems for The Twisted Divisor Function
Abstract
For a fixed θ≠ 0, we define the twisted divisor function τ(n, θ):=Σd ndiθ\ . In this article we consider the error term (x) in the following asymptotic formula Σn≤ x*|τ(n, θ)|2=ω1(θ)x x + ω2(θ)x(θ x) +ω3(θ)x + (x), where ωi(θ) for i=1, 2, 3 are constants depending only on θ. We obtain (T)=(Tα(T)) where α(T) =38-c( T)1/8 and c>0, along with an -bound for the Lebesgue measure of the set of points where the above estimate holds.
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