On a class of noninterpolating solutions of the many-anyon problem

Abstract

In the many-anyon problem in two space dimensions, irregular but square integrable solutions of the Schrodinger equation may exist. A class of such solutions is constructed for anyons confined in a harmonic oscillator. It is shown that these may have lower energies than the usual regular solutions, but they do not exist throughout the range between the bosonic and fermionic limits, and as such do not interpolate continuously.