Rational Elliptic Surfaces and Trigonometry of Non-Euclidean Tetrahedra
Daniil RUDENKO
University of Chicago
http://math.uchicago.edu/~rudenkodaniil/
Date(s) : 29/04/2022 iCal
11h00 - 12h30
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 length of edges, 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. The construction is based on relating mixed Hodge structures, associated to the tetrahedron and the corresponding surface.
[su_spacer size= »10″]Zoom: https://univ-amu-fr.zoom.us/j/82958351649?pwd=anBjWUM5enJpMVZFTTl1UEFyTlVzZz09
Meeting ID: 829 5835 1649
Passcode: see email
Emplacement
Saint-Charles - FRUMAM (2ème étage)
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