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ADE string vacua with discrete torsion
We complete the classification of (2,2) string vacua that can be constructed by diagonal twists of tensor products of minimal models with ADE invariants. Using the \LG\ framework, we compute all spectra from inequivalent models of this type. The completeness of our results is only possible by system...
| Autores principales: | , |
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| Lenguaje: | eng |
| Publicado: |
1993
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1016/0370-2693(93)90133-3 http://cds.cern.ch/record/252145 |
| _version_ | 1780885605424562176 |
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| author | Kreuzer, Maximilian Skarke, Harald |
| author_facet | Kreuzer, Maximilian Skarke, Harald |
| author_sort | Kreuzer, Maximilian |
| collection | CERN |
| description | We complete the classification of (2,2) string vacua that can be constructed by diagonal twists of tensor products of minimal models with ADE invariants. Using the \LG\ framework, we compute all spectra from inequivalent models of this type. The completeness of our results is only possible by systematically avoiding the huge redundancies coming from permutation symmetries of tensor products. We recover the results for (2,2) vacua of an extensive computation of simple current invariants by Schellekens and Yankielowitz, and find 4 additional mirror pairs of spectra that were missed by their stochastic method. For the model $(1)^9$ we observe a relation between redundant spectra and groups that are related in a particular way. |
| id | cern-252145 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1993 |
| record_format | invenio |
| spelling | cern-2521452023-03-14T17:11:07Zdoi:10.1016/0370-2693(93)90133-3http://cds.cern.ch/record/252145engKreuzer, MaximilianSkarke, HaraldADE string vacua with discrete torsionParticle Physics - TheoryGeneral Theoretical PhysicsWe complete the classification of (2,2) string vacua that can be constructed by diagonal twists of tensor products of minimal models with ADE invariants. Using the \LG\ framework, we compute all spectra from inequivalent models of this type. The completeness of our results is only possible by systematically avoiding the huge redundancies coming from permutation symmetries of tensor products. We recover the results for (2,2) vacua of an extensive computation of simple current invariants by Schellekens and Yankielowitz, and find 4 additional mirror pairs of spectra that were missed by their stochastic method. For the model $(1)^9$ we observe a relation between redundant spectra and groups that are related in a particular way.We complete the classification of (2,2) string vacua that can be constructed by diagonal twists of tensor products of minimal models with ADE invariants. Using the \LG\ framework, we compute all spectra from inequivalent models of this type. The completeness of our results is only possible by systematically avoiding the huge redundancies coming from permutation symmetries of tensor products. We recover the results for (2,2) vacua of an extensive computation of simple current invariants by Schellekens and Yankielowitz, and find 4 additional mirror pairs of spectra that were missed by their stochastic method. For the model $(1)~9$ we observe a relation between redundant spectra and groups that are related in a particular way.We complete the classification of (2,2) string vacua that can be constructed by diagonal twists of tensor products of minimal models with ADE invariants. Using the \LG\ framework, we compute all spectra from inequivalent models of this type. The completeness of our results is only possible by systematically avoiding the huge redundancies coming from permutation symmetries of tensor products. We recover the results for (2,2) vacua of an extensive computation of simple current invariants by Schellekens and Yankielowitz, and find 4 additional mirror pairs of spectra that were missed by their stochastic method. For the model $(1)~9$ we observe a relation between redundant spectra and groups that are related in a particular way.We complete the classification of (2,2) string vacua that can be constructed by diagonal twists of tensor products of minimal models with ADE invariants. Using the Landau-Ginzburg framework, we compute all spectra from inequivalent models of this type. The completeness of our results is only possible the systematically avoiding the huge redundancies coming from permutation symmetries of tensor products. We recover the results for (2,2) vacua of an extensive computation of simple current invariants by Schellekens and Yankielowicz, and find 4 additional mirror pairs of spectra. For the model (1) 9 we observe a relation between redundant spectra and groups that are related in a particular way.hep-th/9307145CERN-TH-6931-93ITP-UH-20-93CERN-TH-6931-93ITP-UH-93-20oai:cds.cern.ch:2521451993 |
| spellingShingle | Particle Physics - Theory General Theoretical Physics Kreuzer, Maximilian Skarke, Harald ADE string vacua with discrete torsion |
| title | ADE string vacua with discrete torsion |
| title_full | ADE string vacua with discrete torsion |
| title_fullStr | ADE string vacua with discrete torsion |
| title_full_unstemmed | ADE string vacua with discrete torsion |
| title_short | ADE string vacua with discrete torsion |
| title_sort | ade string vacua with discrete torsion |
| topic | Particle Physics - Theory General Theoretical Physics |
| url | https://dx.doi.org/10.1016/0370-2693(93)90133-3 http://cds.cern.ch/record/252145 |
| work_keys_str_mv | AT kreuzermaximilian adestringvacuawithdiscretetorsion AT skarkeharald adestringvacuawithdiscretetorsion |