English

Exact normalized eigenfunctions for general deformed Hulth\'en potentials

Mathematical Physics 2019-01-30 v1 math.MP Quantum Physics

Abstract

The exact solutions of Schr\"odinger's equation with the deformed Hulth\'en potential Vq(x)=μeδx/(1qeδx), δ,μ,q>0V_q(x)=-{\mu\, e^{-\delta\,x }}/({1-q\,e^{-\delta\,x}}),~ \delta,\mu, q>0 are given, along with a closed--form formula for the normalization constants of the eigenfunctions for arbitrary q>0q>0. The Crum-Darboux transformation is then used to derive the corresponding exact solutions for the extended Hulth\'en potentials V(x)=μeδx/(1qeδx)+qj(j+1)eδx/(1qeδx)2,j=0,1,2,.V(x)= -{\mu\, e^{-\delta\,x }}/({1-q\,e^{-\delta\,x}})+ {q\,j(j+1)\, e^{-\delta\,x }}/({1-q\,e^{-\delta\,x}})^2, j=0,1,2,\dots. A general formula for the new normalization condition is also provided.

Keywords

Cite

@article{arxiv.1812.06383,
  title  = {Exact normalized eigenfunctions for general deformed Hulth\'en potentials},
  author = {Richard L. Hall and Nasser Saad and K. D. Sen},
  journal= {arXiv preprint arXiv:1812.06383},
  year   = {2019}
}

Comments

14 pages, two figures

R2 v1 2026-06-23T06:43:39.476Z