Automorphism groups of Inoue and Kodaira surfaces

Yuri Prokhorov; Constantin Shramov

arXiv:1812.02400·math.AG·April 8, 2019·6 cites

Automorphism groups of Inoue and Kodaira surfaces

Yuri Prokhorov, Constantin Shramov

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TL;DR

This paper proves that the automorphism groups of Inoue and primary Kodaira surfaces possess the Jordan property, contributing to the understanding of their symmetry structures.

Contribution

It establishes the Jordan property for automorphism groups of Inoue and primary Kodaira surfaces, a new result in the study of their symmetries.

Findings

01

Automorphism groups are Jordan groups.

02

Automorphism groups of these surfaces have bounded finite subgroups.

03

Provides insight into the symmetry structures of complex surfaces.

Abstract

We prove that automorphism groups of Inoue and primary Kodaira surfaces are Jordan.

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Taxonomy

TopicsAdvanced Algebra and Geometry · Algebraic Geometry and Number Theory · Finite Group Theory Research