Abstract
One-dimensional ES models, some of which the reader has encountered in the previous chapters, are well studied and appear as standard examples in text books.
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References
Gómez-Ullate, D., Kamran, N., Milson, R.: An extended class of orthogonal polynomials defined by a Sturm-Liouville problem. J. Math. Anal. Appl. 359, 352–367 (2009)
Quesne,C.: Exceptional orthogonal polynomials, exactly solvable potentials and supersymmetry. J. Phys. A: Math. Theor. 41, 392001–392007 (2008). https://doi.org/10.1088/1751-8113/41/39/392001; Quesne,C,: Solvable rational potentials and exceptional orthogonal polynomials in supersymmetric quantum mechanics. SIGMA 5, 084 (2009)
Infeld, L., Hull, T.E.: The factorization method. Rev. Mod. Phys. 23, 21–68 (1951)
Cooper, F., Khare, A., Sukhatme, U.P.: Supersymmetry and quantum mechanics. Phys. Rep. 251, 267–385 (1995)
Cooper, F., Khare, A., Sukhatme, U.P.: Supersymmetric Quantum Mechanics. World Scientific Publishing Co. Ltd. Singapore (2001)
Sree Ranjani, S., et al.: The exceptional orthogonal polynomials, QHJ formalism and the SWKB quantization condition. J. Phys. A: Math Theor. 45, 055210 (2012)
Sasaki, R., Tsujimoto, S., and Zhedanov, A.: Exceptional Laguerre and Jacobi Polynomials and the corresponding potentials through Darboux Crum transformations. J. Phys. A: Math. Theor. 43, 315204 (20pp) (2010)
Odake, S., Sasaki, R.: Infinitely many shape invariant potentials and new orthogonal polynomials. Phys. Lett. B 679, 414–417 (2009)
Gomez-Ullate, D., Kamran, N., Milson, R.: Exceptional orthogonal polynomials and the Darboux transformation. J. Phys. A 43, 434016 (2010)
Grandati, Y.: New rational extensions of solvable potentials with finite bound state spectrum. Phys. Lett. A 376, 2866–2872 (2012)
Grandati, Y.: Solvable rational extensions of the isotonic oscillator. Ann. Phys. 326, 2074–2090 (2011)
Bagchi, B., Grandati, Y., Quesne, C.: Rational extensions of the trigonometric Darboux-Pöschl-Teller potential based on para-Jacobi polynomials. J. Math. Phys. 56, 062103 (11pp) (2015)
Ho, C.-L.: Prepotential approach to solvable rational extensions of Harmonic Oscillator and Morse potentials. J. math. Phys. 52, 122107 (2011)
Grandati,Y.: Rational extensions of solvable potentials and exceptional orthogonal polynomials. J. Phys. Conf. Ser. 343, 012041 (12pp) (2012)
Gómez-Ullate, D., Kamran, N., Milson, R.: Two-step Darboux transformations and exceptional Laguerre polynomials. J. of Math. An. App. 387, 410–418 (2012)
Gómez-Ullate, D., Grandati, Y., Milson, R.: Rational extensions of the quantum harmonic oscillator and exceptional Hermite polynomials. J. Phys. A: Math. Theor. 47, 015203 (2014)
Marquette, I., Quesne, C.: Two-step rational extensions of the harmonic oscillator: exceptional orthogonal polynomials and ladder operators. J. Phys. A: Math. Theor. 46, 155201 (2013)
Quesne, C.: Rationally-extended radial oscillators and Laguerre exceptional orthogonal polynomials in kth-order SUSYQM. Int. J. of Mod. Phys. 26, 5337–5347 (2011)
Sree Ranjani, S., Sandhya R., Kapoor,A.K.: Shape invariant rational extensions and potentials related to exceptional polynomials. Int. Jour. Mod. Phys. A 30, 1550146 (22pp) (2015)
Gendenshtein, L.E.: Derivation of exact spectra of the Schrodinger equation by means of supersymmetry. JETP Lett. 38, 356–359 (1983)
Gelfand, Y.A., Likhtman, E.P.: Extension of the algebra of Poincare group generators and violation of p invariance. JETP Lett. 13, 323–326 (1971)
Wess, J., Zumino,B.: Supergauge transformations in four-dimensions. Nucl. Phys. B 70, 39–50 (1974); ibid.: Supergauge Invariant Extension of Quantum Electrodynamics. B 78, 1–13 (1974)
Witten, E.: Dynamical breaking of supersymmetry. Nucl. Phys. B 188, 513–554 (1981)
Sandhya, R., Sree Ranjani, S., Kapoor, A.K.: Shape invariant potentials in higher dimensions. Ann. Phys. 359, 125–135 (2015)
Dass, T., Sharma, S.K.: Mathematical Methods in Classical and Quantum Physics. Universities Press (India) Limited, Hyderabad (1998). (This book covers several important results in this area)
Dennery, P.A., Kryzwicki.: Mathematics for Physicists. Dover Publications, New York (1967)
Bochner, S.: Uber Sturm-Liouvillesche Polynomsysteme. Math. Z. 29, 730–736 (1929)
Routh, E.J.: On some properties of certain solutions of a differential equation of the second order. London Math. Soc. 16, 245–261 (1885)
Odake, S., Sasaki, R.: Another set of infinitely many exceptional \(X_{l}\) Laguerre polynomials. Phys. Lett. B 684, 173–176 (2010)
Odake, S., Sasaki, R.: Infinitely many shape-invariant potentials and cubic identities of the Laguerre and Jacobi polynomials. J. Math. Phys. 51, 053513 (2010)
Ho, C-L., Odake, S., Sasaki, R.: Properties of the exceptional \(x_{l}\) Laguerre and Jacobi polynomials. SIGMA 7, 107 (24pp) (2011)
Gómez-Ullate, D., Kasman, A., Kuijlaars, A.B.J., Milson, R.: Recurrence relations for exceptional Hermite polynomials. J. App. Th. 204, 1–16 (2016)
Ho, C-.L., Sasaki, R.: Zeros of the exceptional Laguerre and Jacobi polynomials. ISRN Math. Phys. 2012, Article ID 920475 (2012)
Dutta, D.: On the completeness of exceptional orthogonal polynomials in quantum systems. Int. J. App. Math. 26, 601–609 (2013)
Durán, A.J.: Exceptional Charlier and Hermite orthogonal polynomials. J. App. Th. 182, 29–58 (2014)
Liaw, C., Littlejohn, L.L., Milson, R., Stewart, J.: The spectral analysis of three families of exceptional Laguerre polynomials. J. App. Th. 202, 5–41 (2016)
Durán, A.J.: Exceptional Hahn and Jacobi polynomials with an arbitrary number of continuous parameters. J. App. Th. 214, 9 (45pp) (2017)
Durán, A.J.: Integral Transforms and Special Functions, vol. 26 (2015)
GarcÃa-Ferrero, M.A. Gomez-Ullate, Milson, D.R.: Exceptional Gegenbauer polynomials via isospectral deformation. arXiv:2110.04059v1
Sasaki, R.: Universe 2, 2 (2014)
Pappademos, J., Sukhatme, U.P., Pagnamenta, A.: Bound states in the continuum from supersymmetric quantum mechanics. Phys. Rev. A 48, 3525 (1993)
Dutta, D., Roy, P.: Conditionally exactly solvable potentials and exceptional orthogonal polynomials. J. Phys. A: Math. Theor. 51, 042101 (2010)
Shiv Chaitanya, K.V.S., Sree Ranjani, S., Panigrahi, P.K., Radhakrishnan, R., Srinivasan, V.: Exceptional polynomials and SUSY quantum mechanics. Pramana J. Phys. 85, 53–63 (2015)
Odake, S., Sasaki, R.: A new family of shape invariantly deformed Darboux Pöschl Teller Potentials with Continuous \(\ell \). J. Phys. A 44, 195203 (14pp) (2011)
Sree Ranjani, S.: Quantum Hamilton-Jacobi Route to Exceptional Laguerre polynomials and the corresponding rational potentials. Pramana-J. Phys. 93, 29 (14pp) (2019)
Odake, S., Sasaki, R.: Exactly solvable quantum mechanics and infinite families of multi-indexed orthogonal polynomials. Phys. Lett. B 702, 164–170 (2011)
Odake, S.: Recurrence relations of the multi-indexed orthogonal polynomials. III. J. Math. Phys. 57, 023514 (2016)
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Kapoor, A.K., Panigrahi, P.K., Ranjani, S.S. (2022). Rational Extensions. In: Quantum Hamilton-Jacobi Formalism. SpringerBriefs in Physics. Springer, Cham. https://doi.org/10.1007/978-3-031-10624-8_5
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