Asymptotic expansions for the Laplace-Mellin and Riemann-Liouville transforms of Lerch zeta-functions

Abstract

For a complex variable s and real parameters a and λ with a>0, let φ(s,a,λ) denote the Lerch zeta-function with a complex variable, φ(s,a,λ) a slight modification of φ(s,a,λ) defined by extracting the (possible) singularity of φ(s,a,λ) at s=1, and (φ)(m)(s,a,λ) for any m∈Z the mth derivative with respect to s if m≥0, while if m≤0 the |m|-th primitive defined with its initial point at s+∞. The present paper aims to study asymptotic aspects of (φ)(m)(s,a,λ), transformed through the Laplace-Mellin and Riemann-Liouville operators (say, LMz;τα and RLz;τα,β, respectively) in terms of the variable s. We shall show that complete asymptotic expansions exist if a>1 for LMz;τα(φ)(m)(s+τ,a,λ) and RLz;τα,β(φ)(m)(s+τ,a,λ) (Theorems~1--4), as well as for their iterated variants (Theorems~5--10), when the `pivotal' parameter z (of the transforms) tends to both 0 and ∞ through appropriate sectors. Most of our results include any vertical ray in their region of validity; this allows us to deduce complete asymptotic expansions along vertical lines (s,z)=(σ,it) as t∞ (Corollaries~2.1,~4.1,~6.1 and~8.1).