Solution of some integrable one-dimensional quantum systems

Abstract

In this paper, we investigate a family of one-dimensional multicomponent quantum many-body systems. The interaction is an exchange interaction based on the familiar family of integrable systems which includes the inverse square potential. We show these systems to be integrable, and exploit this integrability to completely determine the spectrum including degeneracy, and thus the thermodynamics. The perioidic inverse square case is worked out explicitly. Next, we show that in the limit of strong interaction of the "spin" degrees of freedom decouple. Taking this limit for our example, we obtain a complete solution to a lattice system introduced recently by Shastry and by Haldane; our solution reproduces the numerical results. Finally, we emphasize the simple explanation for the high multiplicities found in this model.