Extended T-systems, Q matrices and T-Q relations for $s\ell(2)$ models at roots of unity
Holger Frahm, Alexi Morin-Duchesne, Paul A. Pearce

TL;DR
This paper develops extended T-systems, Q matrices, and T-Q relations for $s ext{l}(2)$ models at roots of unity, providing explicit closure relations and decompositions that clarify the structure of fused transfer matrices and Bethe roots.
Contribution
It introduces extended T-systems and T-Q relations for $s ext{l}(2)$ models at roots of unity, including explicit closure relations and decompositions, advancing the understanding of these integrable models.
Findings
Explicit closure relations for T-systems at roots of unity
Extended T-Q relations involving new Q matrices
Decomposition of fused transfer matrices in terms of Q functions
Abstract
The mutually commuting fused single and double-row transfer matrices of the critical six-vertex model are considered at roots of unity with crossing parameter a rational fraction of . The transfer matrices of the dense loop model analogs, namely the logarithmic minimal models , are similarly considered. For these models, we find explicit closure relations for the -system functional equations and obtain extended sets of bilinear -system identities. We also define extended matrices as linear combinations of the fused transfer matrices and obtain extended matrix - relations. These results hold for diagonal twisted boundary conditions on the cylinder as well as invariant/Kac vacuum and off-diagonal/Robin vacuum boundary conditions on the strip. Using our…
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