TY - JOUR
T1 - A shortcut to the Q-operator
AU - Bazhanov, Vladimir V.
AU - Łukowski, Tomasz
AU - Meneghelli, Carlo
AU - Staudacher, Matthias
PY - 2010/11
Y1 - 2010/11
N2 - Baxter's Q-operator is generally believed to be the most powerful tool for the exact diagonalization of integrable models. Curiously, it has hitherto not yet been properly constructed in the simplest such system, the compact spin-1/2 Heisenberg-Bethe XXX spin chain. Here we attempt to fill this gap and show how two linearly independent operatorial solutions to Baxter's TQ equation may be constructed as commuting transfer matrices if a twist field is present. The latter are obtained by tracing over infinitely many oscillator states living in the auxiliary channel of an associated monodromy matrix. We furthermore compare our approach to and differentiate it from earlier articles addressing the problem of the construction of the Q-operator for the XXX chain. Finally we speculate on the importance of Q-operators for the physical interpretation of recent proposals for the Y-system of AdS/CFT.
AB - Baxter's Q-operator is generally believed to be the most powerful tool for the exact diagonalization of integrable models. Curiously, it has hitherto not yet been properly constructed in the simplest such system, the compact spin-1/2 Heisenberg-Bethe XXX spin chain. Here we attempt to fill this gap and show how two linearly independent operatorial solutions to Baxter's TQ equation may be constructed as commuting transfer matrices if a twist field is present. The latter are obtained by tracing over infinitely many oscillator states living in the auxiliary channel of an associated monodromy matrix. We furthermore compare our approach to and differentiate it from earlier articles addressing the problem of the construction of the Q-operator for the XXX chain. Finally we speculate on the importance of Q-operators for the physical interpretation of recent proposals for the Y-system of AdS/CFT.
KW - Algebraic structures of integrable models
KW - Integrable spin chains (vertex models)
KW - Quantum integrability (Bethe ansatz)
KW - Symmetries of integrable models
UR - http://www.scopus.com/inward/record.url?scp=78650340217&partnerID=8YFLogxK
U2 - 10.1088/1742-5468/2010/11/P11002
DO - 10.1088/1742-5468/2010/11/P11002
M3 - Article
SN - 1742-5468
VL - 2010
JO - Journal of Statistical Mechanics: Theory and Experiment
JF - Journal of Statistical Mechanics: Theory and Experiment
IS - 11
M1 - P11002
ER -