Polynomial potentials and nilpotent groups

Abstract

This paper deals with the partial solution of the energy-eigenvalue problem for one-dimensional Schr\"odinger operators of the form HN=X02+VN, where VN=XN2+α XN-1 is a polynomial potential of degree (2N-2) and Xi are the generators of an irreducible representation of a particular nilpotent group GN. Algebraization of the eigenvalue problem is achieved for eigenfunctions of the form Σk=0M ak X2k (-∫ dx\, XN). It is shown that the overdetermined linear system of equations for the coefficients ak has a nontrivial solution, if the parameter α and (N-3) Casimir invariants satisfy certain constraints. This general setting works for even N≥ 2 and can also be applied to odd N≥ 3, if the potential is symmetrized by considering it as function of |x| rather than x. It provides a unified approach to quasi-exactly solvable polynomial interactions, including the harmonic oscillator, and extends corresponding results known from the literature. Explicit expressions for energy eigenvalues and eigenfunctions are given for the quasi-exactly solvable sextic, octic and decatic potentials. The case of E=0 solutions for general N and M is also discussed. As physical application, the movement of a charged particle in an electromagnetic field of pertinent polynomial form is shortly sketched.

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