A Lie algebraic approach to effectivemass Schrödinger equations

B Roy; P Roy

doi:10.1088/0305-4470/35/17/310

Journal of Physics A: Mathematical and General

A Lie algebraic approach to effective mass Schrödinger equations

B Roy¹ and P Roy¹

Published 19 April 2002 • Published under licence by IOP Publishing Ltd
Journal of Physics A: Mathematical and General, Volume 35, Number 17 Citation B Roy and P Roy 2002 J. Phys. A: Math. Gen. 35 3961 DOI 10.1088/0305-4470/35/17/310

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¹ Physics and Applied Mathematics Unit, Indian Statistical Institute, Calcutta 700035, India

Dates

Received 1 February 2002
Published 19 April 2002

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Abstract

We use Lie algebraic techniques to obtain exact solutions of the effective mass Schrödinger equation. In particular we use the su(1,1) algebra, both as a spectrum generating algebra and as a potential algebra, to obtain exact solutions of effective mass Schrödinger equations corresponding to a number of potentials. We also discuss the construction of isospectral Hamiltonians for which both the mass and the potential are different.

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