Spectral zeta-Functions and zeta-Regularized Functional Determinants for Regular Sturm-Liouville Operators
Abstract
The principal aim in this paper is to employ a recently developed unified approach to the computation of traces of resolvents and ζ-functions to efficiently compute values of spectral ζ-functions at positive integers associated to regular (three-coefficient) self-adjoint Sturm--Liouville differential expressions τ. Depending on the underlying boundary conditions, we express the ζ-function values in terms of a fundamental system of solutions of τ y = z y and their expansions about the spectral point z=0. Furthermore, we give the full analytic continuation of the ζ-function through a Liouville transformation and provide an explicit expression for the ζ-regularized functional determinant in terms of a particular set of this fundamental system of solutions. An array of examples illustrating the applicability of these methods is provided, including regular Schr\"odinger operators with zero, piecewise constant, and a linear potential on a compact interval.
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