Exceptional orthogonal polynomials, exactly solvable potentials and supersymmetry

We construct two new exactly solvable potentials giving rise to bound-state solutions to the Schrödinger equation, which can be written in terms of the recently introduced Laguerre- or Jacobi-type X1 exceptional orthogonal polynomials. These potentials, extending either the radial oscillator or the Scarf I potential by the addition of some rational terms, turn out to be translationally shape invariant as their standard counterparts and isospectral to them.

[1]  David Gómez-Ullate,et al.  An extension of Bochner's problem: Exceptional invariant subspaces , 2008, J. Approx. Theory.

[2]  R. Milson,et al.  An extended class of orthogonal polynomials defined by a Sturm-Liouville problem , 2008, 0807.3939.

[3]  R. Roychoudhury,et al.  New approach to (quasi-)exactly solvable Schrödinger equations with a position-dependent effective mass , 2005, quant-ph/0505171.

[4]  R. Milson,et al.  Supersymmetry and algebraic Darboux transformations , 2004, nlin/0402052.

[5]  B. Bagchi,et al.  A unified treatment of exactly solvable and quasi-exactly solvable quantum potentials , 2003, math-ph/0302040.

[6]  P. Roy,et al.  Comprehensive analysis of conditionally exactly solvable models , 2001, math-ph/0102017.

[7]  B. Bagchi,et al.  GENERATING ISOSPECTRAL HAMILTONIANS FROM A MODIFIED CRUM–DARBOUX TRANSFORMATION , 1998 .

[8]  Georg Junker Supersymmetric Methods in Quantum and Statistical Physics , 1996 .

[9]  V. G. Bagrov,et al.  Darboux transformation, factorization, and supersymmetry in one-dimensional quantum mechanics , 1995 .

[10]  A. Khare,et al.  Supersymmetry and quantum mechanics , 1994, hep-th/9405029.

[11]  G. Lévai A class of exactly solvable potentials related to the Jacobi polynomials , 1991 .

[12]  G. Lévai A search for shape-invariant solvable potentials , 1989 .

[13]  C. Sukumar Supersymmetric quantum mechanics of one-dimensional systems , 1985 .

[14]  L. Gendenshtein Derivation of Exact Spectra of the Schrodinger Equation by Means of Supersymmetry , 1984 .

[15]  Edward Witten,et al.  Dynamical Breaking of Supersymmetry , 1981 .

[16]  G. Natanzon General properties of potentials for which the Schrödinger equation can be solved by means of hypergeometric functions , 1979 .

[17]  E. Sudarshan,et al.  A class of solvable potentials , 1962 .

[18]  T. E. Hull,et al.  The factorization method , 1951 .