Exiton, Spinon and Spin Wave Modes in an Exactly Soluble One-Dimensional Quantum Many-Body System
Abstract
In this paper, we present the exact solution to a one-dimensional, two-component, quantum many-body system in which like particles interact with a pair potential s(s+1)/ sinh2(r), while unlike particles interact with a pair potential -s(s+1)/ cosh2(r). We first give a proof of integrability, then derive the coupled equations determining the complete spectrum. All singularities occur in the ground state when there are equal numbers of the two components; we give explicit results for the ground state and low-lying states in this case. For s>0, the system is an antiferromagnet/insulator, with excitations consisting of a pair-hole--pair continuum, a two-particle continuum with gap, and excitons with gaps. For -1<s<0, the system has excitations consisting of a hole-particle continuum, and a two-spin wave continuum, both gap-less.
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