A (0,2) Mirror Duality
Publication
, Internet Publication
Plesser, R; Bertolini, M
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.
Duke Scholars
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Plesser, R., & Bertolini, M. (n.d.). A (0,2) Mirror Duality (Unpublished).
Plesser, Ronen, and Marco Bertolini. “A (0,2) Mirror Duality (Unpublished),” n.d.
Plesser R, Bertolini M. A (0,2) Mirror Duality (Unpublished).
Plesser, Ronen, and Marco Bertolini. A (0,2) Mirror Duality (Unpublished).
Plesser R, Bertolini M. A (0,2) Mirror Duality (Unpublished).