Sergey Frolov, Eoin Quinn
We consider two lattice models for strongly correlated electrons which are
exactly-solvable in one dimension. Along with the Hubbard model and the su(2|2)
spin chain, these are the only parity-invariant models that can be obtained
from Shastry's R-matrix. One exhibits itinerant ferromagnetic behaviour, while
for the other the electrons form bound pairs and at half-filling the model
becomes insulating. We derive the TBA equations for the models, analyze them at
various limits, and in particular obtain zero temperature phase diagrams.
Furthermore we consider extensions of the models, which reduce to the
Essler-Korepin-Schoutens model in certain limits.
View original:
http://arxiv.org/abs/1111.5304
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