Artículo
Wavefunctions from energies: Applications in simple potentials
Fecha de publicación:
06/2020
Editorial:
American Institute of Physics
Revista:
Journal of Mathematical Physics
ISSN:
0022-2488
Idioma:
Inglés
Tipo de recurso:
Artículo publicado
Clasificación temática:
Resumen
A remarkable mathematical property—somehow hidden and recently rediscovered—allows obtaining the eigenvectors of a Hermitian matrix directly from their eigenvalues. This opens the possibility to get the wavefunctions from the spectrum, an elusive goal of many fields in physics. Here, the formula is assessed for simple potentials, recovering the theoretical wavefunctions within machine accuracy. A striking feature of this eigenvalue–eigenvector relation is that it does not require knowing any of the entries of the working matrix. However, it requires the knowledge of the eigenvalues of the minor matrices (in which a row and a column have been deleted from the original matrix). We found a pattern in these sub-matrix spectra, allowing us to get the eigenvectors analytically. The physical information hidden behind this pattern is analyzed.
Palabras clave:
ATOMIC WAVEFUNCTIONS
,
NUMERICAL METHODS
,
EIGENVECTOR-EIGENVALUE IDENTITY
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Articulos(IAFE)
Articulos de INST.DE ASTRONOMIA Y FISICA DEL ESPACIO(I)
Articulos de INST.DE ASTRONOMIA Y FISICA DEL ESPACIO(I)
Citación
Mitnik, Dario Marcelo; Mitnik, Santiago A. H.; Wavefunctions from energies: Applications in simple potentials; American Institute of Physics; Journal of Mathematical Physics; 61; 6; 6-2020; 1-11
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