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Ladder Operators for Lam\'e Spheroconal Harmonic Polynomials

Mathematical Physics 2012-10-18 v1 math.MP Quantum Physics

Abstract

Three sets of ladder operators in spheroconal coordinates and their respective actions on Lam\'e spheroconal harmonic polynomials are presented in this article. The polynomials are common eigenfunctions of the square of the angular momentum operator and of the asymmetry distribution Hamiltonian for the rotations of asymmetric molecules, in the body-fixed frame with principal axes. The first set of operators for Lam\'e polynomials of a given species and a fixed value of the square of the angular momentum raise and lower and lower and raise in complementary ways the quantum numbers n1n_1 and n2n_2 counting the respective nodal elliptical cones. The second set of operators consisting of the cartesian components L^x\hat L_x, L^y\hat L_y, L^z\hat L_z of the angular momentum connect pairs of the four species of polynomials of a chosen kind and angular momentum. The third set of operators, the cartesian components p^x\hat p_x, p^y\hat p_y, p^z\hat p_z of the linear momentum, connect pairs of the polynomials differing in one unit in their angular momentum and in their parities. Relationships among spheroconal harmonics at the levels of the three sets of operators are illustrated.

Keywords

Cite

@article{arxiv.1210.4632,
  title  = {Ladder Operators for Lam\'e Spheroconal Harmonic Polynomials},
  author = {Ricardo Méndez-Fragoso and Eugenio Ley-Koo},
  journal= {arXiv preprint arXiv:1210.4632},
  year   = {2012}
}
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