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Advances in Pure Mathematics 2015

Integral Representations for the Solutions of the Generalized Schroedinger Equation in a Finite Interval

DOI: 10.4236/apm.2015.513072, PP. 777-795

Anar Adiloglu Nabiev, Rauf Kh. Amirov

Keywords: One Dimensional Schroedinger Equation, Fundamental Solutions, Transformation Operator, Inte-gral Representation, Differential Equation with Discontinues Coefficient, Kernel of an Integral Op-erator, Integral Equation, Method of Successive Approximations

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Abstract:

We reduce the initial value problem for the generalized Schroedinger equation with piecewise-constant leading coefficient to the system of Volterra type integral equations and construct new useful integral representations for the fundamental solutions of the Schroedinger equation. We also investigate some significant properties of the kernels of these integral representations. The integral representations of fundamental solutions enable to obtain the basic integral equations, which are a powerful tool for solving inverse spectral problems.

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