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.
Displaying 13 - 23 of 23
Format results
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Kahler affine structures and the affine Calabi conjecture
PIRSA:04110026 -
Matrix Factorizations: Stability and Mirror Symmetry
Johannes Walcher McGill University
PIRSA:04110027 -
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Complex, real and tropical curves
PIRSA:04110030 -
Homological mirror symmetry for Fano surfaces
Denis Auroux University of California, Berkeley
PIRSA:04110031 -
Towards (0,2) Mirror Symmetry
Allan Adams Massachusetts Institute of Technology (MIT) - Department of Physics
PIRSA:04110032 -
Affine geometry of degeneration limits and mirror symmetry
PIRSA:04110033 -
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(0,2) correlation functions
PIRSA:04110035 -
Hochschild structures: an algebraic geometer's point of view
PIRSA:04110036