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Dispersion relations and spectral densities
Author(s) -
Brändas Erkki,
Hehenberger Michael,
McIntosh Harold V.
Publication year - 1975
Publication title -
international journal of quantum chemistry
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.484
H-Index - 105
eISSN - 1097-461X
pISSN - 0020-7608
DOI - 10.1002/qua.560090111
Subject(s) - reciprocal , dispersion relation , mathematics , eigenvalues and eigenvectors , mathematical analysis , boundary value problem , physics , perturbation theory (quantum mechanics) , interpretation (philosophy) , spectral theory , perturbation (astronomy) , ordinary differential equation , mathematical physics , differential equation , quantum mechanics , hilbert space , philosophy , linguistics , computer science , programming language
Abstract Weyl's eigenvalue theory for ordinary second‐order differential equations is discussed for the case of a continuous spectrum. It is demonstrated that the spectral density function obtained from a suitably averaged Green's function, equal to the Weinstein function, can be directly related to the Weyl–Titchmarsh m ‐function. The explicit connections with scattering theory are derived and it is found that the Weyl and Jost solutions are proportional; the proportionality factor being the reciprocal value of the latter at the origin. The physical interpretation of the complex poles of the spectral density is discussed in relation to Gamow's exponentially growing functions. The advantage of using a formulation that allows for a “perturbation” of boundary conditions is pointed out.