Crosscaps in Gepner Models and the Moduli space of T2 Orientifolds

Abstract

We study T2 orientifolds and their moduli space in detail. Geometrical insight into the involutive automorphisms of T2 allows a straightforward derivation of the moduli space of orientifolded T2s. Using c=3 Gepner models, we compare the explicit worldsheet sigma model of an orientifolded T2 compactification with the CFT results. In doing so, we derive half-supersymmetry preserving crosscap coefficients for generic unoriented Gepner models using simple current techniques to construct the charges and tensions of Calabi-Yau orientifold planes. For T2s we are able to identify the O-plane charge directly as the number of fixed points of the involution; this number plays an important role throughout our analysis. At several points we make connections with the mathematical literature on real elliptic curves. We conclude with a preliminary extension of these results to elliptically fibered K3s.

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