Exact solutions of graded Temperley-Lieb Hamiltonians
A. Lima-Santos
TL;DR
This paper presents exact solutions for orthosympletic Hamiltonians derived from the Temperley-Lieb algebra, using the coordinate Bethe Ansatz to analyze their spectra under various boundary conditions.
Contribution
It introduces a method to solve orthosympletic Hamiltonians exactly, expanding the understanding of their spectral properties.
Findings
Spectra obtained for open boundary conditions
Spectra obtained for closed boundary conditions
Exact solutions via coordinate Bethe Ansatz
Abstract
Orthosympletic Hamiltonians derived from representations of the Temperley-Lieb algebra are presented and solved via the coordinate Bethe Ansatz. The spectra of these Hamiltonians are obtained using open and closed boundary conditions.
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