On the decrease of the number of bound states with the increase of the angular momentum

Abstract

For the class of central potentials possessing a finite number of bound states and for which the second derivative of r V(r) is negative, we prove, using the supersymmetric quantum mechanics formalism, that an increase of the angular momentum by one unit yields a decrease of the number of bound states of at least one unit: N+1 N-1. This property is used to obtain, for this class of potential, an upper limit on the total number of bound states which significantly improves previously known results.

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