Type: Article
Publication Date: 2002-01-01
Citations: 28
DOI: https://doi.org/10.4310/atmp.2002.v6.n2.a2
We investigate strings at singularities of GVholonomy manifolds which arise in Z2 orbifolds of Calabi-Yau spaces times a circle.The singularities locally look like E 4 /Z2 fibered over a SLAG, and can globally be embedded in CICYs in weighted projective spaces.The local model depends on the choice of a discrete torsion in the fibration, and the global model on an anti-holomorphic involution of the Calabi-Yau hyper surf ace.We determine how these choices are related to each other by computing a Wilson surface detecting discrete torsion.We then follow the same orbifolds to the non-geometric Landau-Ginzburg region of moduli space.We argue that the symmetry-breaking twisted sectors are effectively captured by real Landau-Ginzburg potentials.In particular, we find agreement in the low-energy spectra of strings computed from geometry and Gepner-model CFT.Along the way, we construct the full modular data of orbifolds of J\f = 2 minimal models by the mirror automorphism, and give a real-LG interpretation of their modular invariants.Some of the models provide examples of the mirror-symmetry phenomenon for G2 holonomy.