Small g and large λ solution of the Schrodinger equation for the interaction λx²/(1+gx²)

1 October 1979

journal article
Published by IOP Publishing in Journal of Physics A: General Physics

Vol. 12 (10) , L253-L258
https://doi.org/10.1088/0305-4470/12/10/003

Abstract

Using perturbation theory, asymptotic expansions are derived for the eigenenergies and eigenfunctions of the wave equation for the interaction lambda x²/(1+gx²) in the range of small values of g and large values of lambda . The first few energy eigenvalues are calculated and found to be comparable with the non-perturbative results obtained by Mitra (1978).

Keywords

This publication has 5 references indexed in Scilit:

On the interaction of the type λx2/(1+g x2)
Journal of Mathematical Physics, 1978
Four examples of the inverse method as a canonical transformation
Journal of Mathematical Physics, 1975
Eigenvalues of λx2m anharmonic oscillators
Journal of Mathematical Physics, 1973
Perturbation Theory for Large Coupling Constants Applied to the Gauss Potential
Journal of Mathematical Physics, 1970
The influence of higher order contributions to the correlation function of the intensity fluctuation in a Laser near threshold
The European Physical Journal A, 1967

Small g and large λ solution of the Schrodinger equation for the interaction λx2/(1+gx2)

Abstract

Keywords

Small g and large λ solution of the Schrodinger equation for the interaction λx²/(1+gx²)