Combinatorial mirror symmetry
id:
combinatorial-mirror-symmetry-285-3335113
title:
Combinatorial mirror symmetry
text:
A purely combinatorial approach to mirror symmetry was suggested by Victor Batyrev using the polar duality for d -dimensional convex polyhedra. The most famous examples of the polar duality provide Platonic solids: e.g., the cube is dual to octahedron, the dodecahedron is dual to icosahedron. There is a natural bijection between the k -dimensional faces of a d -dimensional convex polyhedron P and -dimensional faces of the dual polyhedron P ∗ and one has ∗ = P . In Batyrev's combinatorial approac
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https://en.wikipedia.org/wiki/Combinatorial_mirror_symmetry
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date modified:
2022-07-26T05:23:54Z
main entity:
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