Asymptotics of a Mathieu-Gaussian series
Abstract
We consider the asymptotic expansion of the functional series \[Sμ,γ(a;λ)=Σn=1∞ nγ e-λ n2/a2(n2+a2)μ\] for real values of the parameters γ, λ>0 and μ≥0 as |a| ∞ in the sector |\,a|<π/4. For general values of γ the expansion is of algebraic type with terms involving the Riemann zeta function and a terminating confluent hypergeometric function. Of principal interest in this study is the case corresponding to even integer values of γ, where the algebraic-type expansion consists of a finite number of terms together with a contribution comprising an infinite sequence of increasingly subdominant exponentially small expansions. This situation is analogous to the well-known Poisson-Jacobi formula corresponding to the case μ=γ=0. Numerical examples are provided to illustrate the accuracy of these expansions.
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