Exactly Solvable Hydrogen-like Potentials and Factorization Method
Abstract
A set of factorization energies is introduced, giving rise to a generalization of the Schr\"odinger (or Infeld and Hull) factorization for the radial hydrogen-like Hamiltonian. An algebraic intertwining technique involving such factorization energies leads to derive n-parametric families of potentials in general almost-isospectral to the hydrogen-like radial Hamiltonians. The construction of SUSY partner Hamiltonians with ground state energies greater than the corresponding ground state energy of the initial Hamiltonian is also explicitly performed.
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