Klein's arrangements of lines and conics

G\'abor G\'evay; Piotr Pokora

arXiv:2211.15309·math.AG·July 9, 2024·1 cites

Klein's arrangements of lines and conics

G\'abor G\'evay, Piotr Pokora

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TL;DR

This paper explores complex arrangements of lines and conics inspired by Klein's 21-line configuration, providing new geometric constructions and insights into their properties.

Contribution

It introduces novel arrangements of lines and conics based on Klein's classical 21-line configuration, expanding understanding of their geometric relationships.

Findings

01

New arrangements derived from Klein's configuration

02

Insights into geometric properties of line and conic arrangements

03

Potential applications in algebraic geometry

Abstract

In this paper we construct several arrangements of lines and/or conics that are derived from the geometry of the Klein arrangement of $21$ lines in the complex projective plane.

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Taxonomy

Topicsgraph theory and CDMA systems · Mathematics and Applications · Finite Group Theory Research