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New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity
We derive fusion rules for the composition of $q$-deformed classical representations (arising in tensor products of the fundamental representation) with semi-periodic representations of $SL(N)_q$ at roots of unity. We obtain full reducibility into semi-periodic representations. On the other hand, he...
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| Lenguaje: | eng |
| Publicado: |
1992
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| Acceso en línea: | https://dx.doi.org/10.1016/0370-2693(92)90768-Y http://cds.cern.ch/record/232595 |
| _version_ | 1780884278315319296 |
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| author | Arnaudon, Daniel |
| author_facet | Arnaudon, Daniel |
| author_sort | Arnaudon, Daniel |
| collection | CERN |
| description | We derive fusion rules for the composition of $q$-deformed classical representations (arising in tensor products of the fundamental representation) with semi-periodic representations of $SL(N)_q$ at roots of unity. We obtain full reducibility into semi-periodic representations. On the other hand, heterogeneous $\cR$-matrices which intertwine tensor products of periodic or semi-periodic representations with $q$-deformed classical representations are given. These $\cR$-matrices satisfy all the possible Yang Baxter equations with one another and, when they exist, with the $\cR$-matrices intertwining homogeneous tensor products of periodic or semi-periodic representations. This compatibility between these two kinds of representations has never been used in physical models. |
| id | cern-232595 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1992 |
| record_format | invenio |
| spelling | cern-2325952020-07-23T02:44:48Zdoi:10.1016/0370-2693(92)90768-Yhttp://cds.cern.ch/record/232595engArnaudon, DanielNew fusion rules and R-matrices for SL(N)$_{q}$ at roots of unityMathematical Physics and MathematicsParticle Physics - TheoryWe derive fusion rules for the composition of $q$-deformed classical representations (arising in tensor products of the fundamental representation) with semi-periodic representations of $SL(N)_q$ at roots of unity. We obtain full reducibility into semi-periodic representations. On the other hand, heterogeneous $\cR$-matrices which intertwine tensor products of periodic or semi-periodic representations with $q$-deformed classical representations are given. These $\cR$-matrices satisfy all the possible Yang Baxter equations with one another and, when they exist, with the $\cR$-matrices intertwining homogeneous tensor products of periodic or semi-periodic representations. This compatibility between these two kinds of representations has never been used in physical models.We derive fusion rules for the composition of $q$-deformed classical representations (arising in tensor products of the fundamental representation) with semi-periodic representations of $SL(N)_q$ at roots of unity. We obtain full reducibility into semi-periodic representations. On the other hand, heterogeneous $\cR$-matrices which intertwine tensor products of periodic or semi-periodic representations with $q$-deformed classical representations are given. These $\cR$-matrices satisfy all the possible Yang Baxter equations with one another and, when they exist, with the $\cR$-matrices intertwining homogeneous tensor products of periodic or semi-periodic representations. This compatibility between these two kinds of representations has never been used in physical models.We derive fusion rules for the composition of q -deformed classical representations (arising in tensor products of the fundamental representation) with semi-periodic representations of SL( N ) q at roots of unity. We obtain full reducibility into semi-periodic representations. On the other hand, heterogeneous R -matrices which intertwine tensor products of periodic or semi-periodic representations with q -deformed classical representations are given. These R -matrices satisfy all the possible Yang-Baxter equations with one another and, when they exist, with the R -matrices intertwining homogeneous tensor products of periodic or semi-periodic representations. This compatibility between these two kinds of representations has never been used in physical models.hep-th/9112022CERN-TH-6324-91CERN-TH-6324-91oai:cds.cern.ch:2325951992 |
| spellingShingle | Mathematical Physics and Mathematics Particle Physics - Theory Arnaudon, Daniel New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity |
| title | New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity |
| title_full | New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity |
| title_fullStr | New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity |
| title_full_unstemmed | New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity |
| title_short | New fusion rules and R-matrices for SL(N)$_{q}$ at roots of unity |
| title_sort | new fusion rules and r-matrices for sl(n)$_{q}$ at roots of unity |
| topic | Mathematical Physics and Mathematics Particle Physics - Theory |
| url | https://dx.doi.org/10.1016/0370-2693(92)90768-Y http://cds.cern.ch/record/232595 |
| work_keys_str_mv | AT arnaudondaniel newfusionrulesandrmatricesforslnqatrootsofunity |