This meeting will be an international gathering of leading researchers to discuss the latest developments in our understanding of "mirror symmetry", a surprising relation that can exist between two Calabi-Yau manifolds. It happens that two such geometries may look very different, but are nevertheless equivalent when employed as hidden dimensions in string theory. Mirror symmetry has become a very powerful tool in both physics and mathematics.
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Format results
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Motives and Strings. (no audio)
PIRSA:04110015 -
Generalized Kahler geometry and T-duality (no audio)
Marco Gualtieri University of Toronto
PIRSA:04110016 -
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T-duality for holomorphic non-commutative tori
PIRSA:04110018 -
Affine structures, mirror symmetry, and K3 surfaces
PIRSA:04110019 -
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Topological sigma-models and generalized complex geometry
Anton Kapustin California Institute of Technology (Caltech) - Division of Physics Mathematics & Astronomy
PIRSA:04110022 -
Higher Genus Amplitudes on Compact Calabi-Yau and Threshold Corrections
Albrecht Klemm Rheinische Friedrich-Wilhelms-Universität Bonn
PIRSA:04110023 -
Strominger-Yau-Zaslow revisited
David Morrison University of California, Santa Barbara
PIRSA:04110024 -
Cohomology groups in mirror symmetry
PIRSA:04110025