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Main Authors: Merta, Łukasz, Zieliński, Marcin
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.13997
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author Merta, Łukasz
Zieliński, Marcin
author_facet Merta, Łukasz
Zieliński, Marcin
contents In this note, we examine the arrangements of lines and configurations of points that emerge from Fermat (von Dyck) and Komiya-Kuribayashi quartics. These quartics are characterized by having the maximum number of lines of maximal tangency, that is, lines for which the intersection multiplicity at the tangency point is equal to the degree of the curve. Additionally, we delve into the study of sextactic points on these quartics - points at which there exists a conic with the curve having a local intersection multiplicity of at least 6, which is one more than that observed at a general point - alongside the related configurations of conics.
format Preprint
id arxiv_https___arxiv_org_abs_2410_13997
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On quartics with the maximal number of the maximal tangency lines
Merta, Łukasz
Zieliński, Marcin
Algebraic Geometry
14C20 (Primary), 14N20 (Secondary)
In this note, we examine the arrangements of lines and configurations of points that emerge from Fermat (von Dyck) and Komiya-Kuribayashi quartics. These quartics are characterized by having the maximum number of lines of maximal tangency, that is, lines for which the intersection multiplicity at the tangency point is equal to the degree of the curve. Additionally, we delve into the study of sextactic points on these quartics - points at which there exists a conic with the curve having a local intersection multiplicity of at least 6, which is one more than that observed at a general point - alongside the related configurations of conics.
title On quartics with the maximal number of the maximal tangency lines
topic Algebraic Geometry
14C20 (Primary), 14N20 (Secondary)
url https://arxiv.org/abs/2410.13997