Approximate functional equation and upper bounds for the Barnes double zeta-function

Abstract

As one of the asymptotic formulas of the zeta-function, Hardy and Littlewood gave asymptotic formulas called the approximate functional equation. In this paper, we prove an approximate functional equation of the Barnes double zeta-function ζ2 (s, α ; v, w ) = Σm=0∞ Σn=0∞ (α+vm+wn)-s . Also, applying this approximate functional equation and the van der Corput method, we obtain upper bounds for ζ2(1/2 + it, α ; v, w) and ζ2(3/2 + it, α ; v, w) with respect to t as t → ∞ .