Ordinary $r$--tuples in cyclic quotient surface singularities

Jos\'e I. Cogolludo-Agust\'in; Tam\'as L\'aszlo; Jorge; Mart\'in-Morales; Andr\'as N\'emethi

arXiv:2410.15878·math.AG·October 22, 2024

Ordinary $r$--tuples in cyclic quotient surface singularities

Jos\'e I. Cogolludo-Agust\'in, Tam\'as L\'aszlo, Jorge, Mart\'in-Morales, Andr\'as N\'emethi

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TL;DR

This paper characterizes Weil divisors in cyclic quotient surface singularities that correspond to abstract r-tuple curve singularities, providing a detailed description of their structure.

Contribution

It offers a novel classification of Weil divisors related to r-tuple curve singularities in cyclic quotient surface singularities.

Findings

01

Identifies which Weil divisors correspond to r-tuple curve singularities.

02

Provides explicit descriptions of these divisors.

03

Enhances understanding of the structure of cyclic quotient surface singularities.

Abstract

We describe those Weil divisors of cyclic quotient surface singularities which are (abstract) $r$ --tuple curve singularities.

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Mathematics and Applications · Geometric and Algebraic Topology