Belitsky, A. V. and Derkachov, S. E. and Korchemsky, G. P. and Manashov, A. N. (2007) The Baxter Q-operator for the graded SL(2|1) spin chain. JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT: P01005. ISSN 1742-5468,
Full text not available from this repository. (Request a copy)Abstract
We study an integrable non-compact superspin chain model that emerged in recent studies of the dilatation operator in the N = 1 super-Yang Mills theory. It was found that the latter can be mapped into a homogeneous Heisenberg magnet with the quantum space in all sites corresponding to infinite dimensional representations of the SL(2/1) group. We extend the method of the Baxter Q-operator to spin chains with supergroup symmetry and apply it to determine the eigenspectrum of the model. Our analysis relies on a factorization property of the R-operators acting on the tensor product of two generic infinite dimensional SL(2/1) representations. It allows us to factorize an arbitrary transfer matrix into a product of three 'elementary' transfer matrices which we identify as Baxter Q-operators. We establish functional relations between transfer matrices and use them to derive the T-Q relations for the Q-operators. The proposed construction can be generalized to integrable models based on supergroups of higher rank and, as distinct from the Bethe ansatz, it is not sensitive to the existence of the pseudovacuum state in the quantum space of the model.
| Item Type: | Article |
|---|---|
| Uncontrolled Keywords: | LIE SUPERALGEBRA SL(R+1-VERTICAL-BAR-S+1); ANALYTIC BETHE-ANSATZ; CONFORMAL FIELD-THEORY; ONE-PARAMETER FAMILY; T-J MODEL; IRREDUCIBLE REPRESENTATIONS; FUNCTIONAL-EQUATIONS; INTEGRABLE STRUCTURE; TWIST-3 OPERATORS; CONTINUUM-LIMIT; integrable spin chains (vertex models); quantum integrability (Bethe ansatz) |
| Subjects: | 500 Science > 530 Physics |
| Divisions: | Physics > Institute of Theroretical Physics |
| Depositing User: | Dr. Gernot Deinzer |
| Date Deposited: | 12 Jan 2021 11:11 |
| Last Modified: | 12 Jan 2021 11:11 |
| URI: | https://pred.uni-regensburg.de/id/eprint/33464 |
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