Mirror Symmetry
Homological mirror symmetry and Gromov–Witten invariants.
Mirror Symmetry. Homological mirror symmetry and Gromov–Witten invariants.
Foundations and canonical references
The standard treatments of mirror symmetry approach the subject from complementary angles. Hori, Mirror Symmetry (2003) is the anchor reference for the subject and lays out the core definitions, theorems, and worked examples that practitioners return to.
Open methodological questions for mirror symmetry include sharpening the bridges between foundational theory and computational practice, extending classical results to broader or more structured settings, and integrating the techniques surveyed above with adjacent mathematical disciplines. The references listed in this page are the entry points that current work builds on.
Prerequisites
Sources
- textbook · primary · 2003Mirror Symmetryhori-2003, katz-2003, klemm-2003, pandharipande-2003, thomas-2003, vafa-2003, vakil-2003, zaslow-2003
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