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The analytic structure of trigonometric S-matrices
$S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which...
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| Lenguaje: | eng |
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1994
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| Acceso en línea: | https://dx.doi.org/10.1016/0550-3213(94)90435-9 http://cds.cern.ch/record/249438 |
| _version_ | 1780885441979875328 |
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| author | Hollowood, Timothy J. |
| author_facet | Hollowood, Timothy J. |
| author_sort | Hollowood, Timothy J. |
| collection | CERN |
| description | $S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the $S$-matrix of the principal chiral model is shown to be consistent via an argument which uses a novel application of the Coleman-Thun mechanism. The analysis also gives a correct description of the analytic structure of the $S$-matrix of the principle chiral model for $c_m$. |
| id | cern-249438 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1994 |
| record_format | invenio |
| spelling | cern-2494382023-03-14T20:45:57Zdoi:10.1016/0550-3213(94)90435-9http://cds.cern.ch/record/249438engHollowood, Timothy J.The analytic structure of trigonometric S-matricesGeneral Theoretical Physics$S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the $S$-matrix of the principal chiral model is shown to be consistent via an argument which uses a novel application of the Coleman-Thun mechanism. The analysis also gives a correct description of the analytic structure of the $S$-matrix of the principle chiral model for $c_m$.$S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the $S$-matrix of the principal chiral model is shown to be consistent.$S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the $S$-matrix of the principal chiral model is shown to be consistent.$S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the $S$-matrix of the principal chiral model is shown to be consistent.$S$-matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the $a_{m-1}$ and $c_m$ algebras the complete $S$-matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the $S$-matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the $S$-matrix of the principal chiral model is shown to be consistent.S -matrices associated to the vector representations of the quantum groups for the classical Lie algebras are constructed. For the a m −1 and c m algebras the complete S -matrix is found by an application of the bootstrap equations. It is shown that the simplest form for the S -matrix which generalizes that of the Gross-Neveu model is not consistent for the non-simply-laced algebras due to the existence of unexplained singularities on the physical strip. However, a form which generalizes the S -matrix of the principal chiral model is shown to be consistent via an argument which uses a novel application of the Coleman-Thun mechanism. The analysis also gives a correct description of the analytic structure of the S -matrix of the principle chiral model for c m .hep-th/9305042CERN-TH-6888-93CERN-TH-6888-93oai:cds.cern.ch:2494381994 |
| spellingShingle | General Theoretical Physics Hollowood, Timothy J. The analytic structure of trigonometric S-matrices |
| title | The analytic structure of trigonometric S-matrices |
| title_full | The analytic structure of trigonometric S-matrices |
| title_fullStr | The analytic structure of trigonometric S-matrices |
| title_full_unstemmed | The analytic structure of trigonometric S-matrices |
| title_short | The analytic structure of trigonometric S-matrices |
| title_sort | analytic structure of trigonometric s-matrices |
| topic | General Theoretical Physics |
| url | https://dx.doi.org/10.1016/0550-3213(94)90435-9 http://cds.cern.ch/record/249438 |
| work_keys_str_mv | AT hollowoodtimothyj theanalyticstructureoftrigonometricsmatrices AT hollowoodtimothyj analyticstructureoftrigonometricsmatrices |