Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
8184974 | Nuclear Physics B | 2018 | 44 Pages |
Abstract
Using anisotropic R-matrices associated with affine Lie algebras gË (specifically, A2n(2), A2nâ1(2), Bn(1), Cn(1), Dn(1)) and suitable corresponding K-matrices, we construct families of integrable open quantum spin chains of finite length, whose transfer matrices are invariant under the quantum group corresponding to removing one node from the Dynkin diagram of gË. We show that these transfer matrices also have a duality symmetry (for the cases Cn(1) and Dn(1)) and additional Z2 symmetries that map complex representations to their conjugates (for the cases A2nâ1(2), Bn(1) and Dn(1)). A key simplification is achieved by working in a certain “unitary” gauge, in which only the unbroken symmetry generators appear. The proofs of these symmetries rely on some new properties of the R-matrices. We use these symmetries to explain the degeneracies of the transfer matrices.
Related Topics
Physical Sciences and Engineering
Mathematics
Mathematical Physics
Authors
Rafael I. Nepomechie, Ana L. Retore,