New Exactly and Conditionally Exactly Solvable N-Body Problems in One Dimension

Abstract

We study a class of Calogero-Sutherland type one dimensional N-body quantum mechanical systems, with potentials given by V( x1, x2, ·s xN) = Σi <j g (xi - xj)2 - gΣi<j(xi - xj)2 + U(Σi<j(xi - xj)2), where U(Σi<j(xi - xj)2)'s are of specific form. It is shown that, only for a few choices of U, the eigenvalue problems can be solved exactly, for arbitrary g. The eigen spectra of these Hamiltonians, when g 0, are non-degenerate and the scattering phase shifts are found to be energy dependent. It is further pointed out that, the eigenvalue problems are amenable to solution for wider choices of U, if g is conveniently fixed. These conditionally exactly solvable problems also do not exhibit energy degeneracy and the scattering phase shifts can be computed only for a specific partial wave.

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