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Algebraic Geometry and Arithmetic: a conference on the occasion of V.V. Nikulin 70th birthday
October 23, 2020 12:15–13:15, г. Moscow, online
 


Enriques surfaces and Leech lattice

S. Kondo
Video records:
MP4 223.5 Mb
Supplementary materials:
Adobe PDF 3.2 Mb

Number of views:
This page:209
Video files:30
Materials:31



Abstract: Let $L$ be an even unimodular lattice of signature $(1,25)$ which is unique up to isomorphisms. J.H. Conway found a fundamental domain $C$ of the reflection group of $L$ by using a theory of Leech lattice. Recently S. Brandhorst and I. Shimada have classified all primitive embeddings of $E_{10}(2)$ into $L$, where $E_{10}(2)$ is the pullback of the Picard lattice of an Enriques surface to the covering K3 surface. There are exactly $17$ embeddings. By restricting $C$ to the positive cone of $E_{10} \otimes \mathbf{R}$ we obtain $17$ polyhedrons. In this talk I would like to discuss the automorphism groups of Enriques and Coble surfaces in terms of these polyhedrons.

Supplementary materials: Kondo_slides.pdf (3.2 Mb)

Language: English
 
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