2020-11-27T03:51:59Zhttps://gredos.usal.es/oai/requestoai:gredos.usal.es:10366/1331392020-06-18T14:54:53Zcom_10366_116214com_10366_4512com_10366_3823col_10366_116215
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González León, Miguel Ángel
author
Mateos Guilarte, Juan
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Torre Mayado, Marina de la
author
2016
[EN] The quantum problem of an electron moving in a plane under the field created by two Coulombian centers admits simple analytical solutions for some particular intercenter distances. These elementary eigenfunctions, akin to those found by Demkov for the analogous three-dimensional problem, are calculated using the framework of quasi-exact solvability of a pair of entangled ODE's descendants from the Heun equation. A different but interesting situation arises when the two centers have the same strength. In this case completely elementary solutions do not exist.
González León, M. A., Mateos Guilarte, J. and Torre Mayado, M. de la. (2016). Elementary solutions of the quantum planar two-center problem. EPL, 114(3), 30007
http://hdl.handle.net/10366/133139
https://doi.org/10.1209/0295-5075/114/30007
Solutions of wave equations: bound states
Mathematical physics
Integrable systems
Calculations and mathematical techniques in atomic and molecular physics
Elementary solutions of the quantum planar two-center problem