A (0,2) mirror duality
| dc.contributor.author | Bertolini, Marco | |
| dc.contributor.author | Plesser, M Ronen | |
| dc.date.accessioned | 2019-12-23T03:27:38Z | |
| dc.date.available | 2019-12-23T03:27:38Z | |
| dc.date.updated | 2019-12-23T03:27:37Z | |
| dc.description.abstract | We construct a class of exactly solved (0,2) heterotic compactifications, similar to the (2,2) models constructed by Gepner. We identify these as special points in moduli spaces containing geometric limits described by non-linear sigma models on complete intersection Calabi-Yau spaces in toric varieties, equipped with a bundle whose rank is strictly greater than that of the tangent bundle. These moduli spaces do not in general contain a locus exhibiting (2,2) supersymmetry. A quotient procedure at the exactly solved point realizes the mirror isomorphism, as was the case for Gepner models. We find a geometric interpretation of the mirror duality in the context of hybrid models. | |
| dc.identifier.uri | ||
| dc.subject | hep-th | |
| dc.subject | hep-th | |
| dc.title | A (0,2) mirror duality | |
| dc.type | Journal article | |
| duke.contributor.orcid | Plesser, M Ronen|0000-0002-6657-6665 | |
| pubs.organisational-group | Trinity College of Arts & Sciences | |
| pubs.organisational-group | Duke | |
| pubs.organisational-group | Mathematics | |
| pubs.organisational-group | Physics |