Mirror symmetry is T duality

@article{Strominger1996MirrorSI,
  title={Mirror symmetry is T duality},
  author={A. Strominger and S. Yau and E. Zaslow},
  journal={Nuclear Physics},
  year={1996},
  volume={479},
  pages={243-259}
}
Abstract It is argued that every Calabi-Yau manifold X with a mirror Y admits a family of supersymmetric toroidal 3-cycles. Moreover the moduli space of such cycles together with their flat connections is precisely the space Y . The mirror transformation is equivalent to T -duality on the 3-cycles. The geometry of moduli space is addressed in a general framework. Several examples are discussed. 
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References

SHOWING 1-10 OF 28 REFERENCES
U-duality and integral structures
  • 51
  • PDF
Mirror symmetry and the type II string
  • 31
  • PDF
Fivebranes, membranes and non-perturbative string theory
  • 658
  • Highly Influential
  • PDF
New vacua for type II string theory
  • 371
  • PDF
N = 1 string duality
  • 26
  • PDF
A canonical way to deform a Lagrangian submanifold
  • 60
  • PDF
...
1
2
3
...