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Семинар отдела алгебры и отдела алгебраической геометрии (семинар И. Р. Шафаревича)
17 сентября 2019 г. 15:00, г. Москва, МИАН, комн. 540 (ул. Губкина, 8)
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Non-Euclidean Tetrahedra and Rational Elliptic Surfaces
D. G. Rudenko |
Количество просмотров: |
Эта страница: | 204 |
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Аннотация:
I will explain how to construct a
rational elliptic surface out of every non-Euclidean
tetrahedra. This surface "remembers" the trigonometry of the
tetrahedron: the edge lengths, the dihedral angles and the volume
can be naturally computed in terms of the surface. The main property
of this construction is self-duality: the surfaces obtained from the
tetrahedron and its dual coincide. This leads to some unexpected
relations between angles and edges of the tetrahedron. For instance,
the cross-ratio of the exponents of the spherical angles coincides
with the cross-ratio of the exponents of the perimeters of its
faces. I will explain two proofs of these facts. The first proof
uses classical birational geometry technics. The second one is
based on relating mixed Hodge structures, associated to the
tetrahedron and the corresponding surface.
Язык доклада: английский
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