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The complete conformal spectrum of a $sl(2|1)$ invariant network model and logarithmic corrections

arXiv:1008.2653 · doi:10.1088/1742-5468/2010/12/P12010

Abstract

We investigate the low temperature asymptotics and the finite size spectrum of a class of Temperley-Lieb models. As reference system we use the spin-1/2 Heisenberg chain with anisotropy parameter $Δ$ and twisted boundary conditions. Special emphasis is placed on the study of logarithmic corrections appearing in the case of $Δ=1/2$ in the bulk susceptibility data and in the low-energy spectrum yielding the conformal dimensions. For the $sl(2|1)$ invariant 3-state representation of the Temperley-Lieb algebra with $Δ=1/2$ we give the complete set of scaling dimensions which show huge degeneracies.

18 pages, 5 figures