Classification of degree two curves in the symmetric square with positive self-intersection

Meritxell Sáez

doi:10.1515/advgeom-2017-0046

Classification of degree two curves in the symmetric square with positive self-intersection

Meritxell Sáez^*

^*Corresponding author for this work

IQS School of Engineering

Research output: Indexed journal article › Article › peer-review

Abstract

We give a precise classification of the pairs (C, B) with C a smooth curve of genus g and B C⁽²⁾ a curve of degree two and posit?"""""""""""""""""""""""""""""""""""""""""""""""""""""""""""""e self-intersection. We prove that there are no such pairs if g < p_a(B) < 2g-1. We study the singularities and self-intersection of any degree two curve in C⁽²⁾. Moreover, we give examples of curves with arithmetic genus in the Brill-Noether range and positive self-intersection on C × C.

Original language	English
Pages (from-to)	161-180
Number of pages	20
Journal	Advances in Geometry
Volume	18
Issue number	2
DOIs	https://doi.org/10.1515/advgeom-2017-0046
Publication status	Published - 25 Apr 2018

Keywords

Symmetric product
curve
curves in surfaces
irregular surface

Access to Document

10.1515/advgeom-2017-0046

Cite this

@article{311052bffeb24137b377f9881749feb1,

title = "Classification of degree two curves in the symmetric square with positive self-intersection",

abstract = "We give a precise classification of the pairs (C, B) with C a smooth curve of genus g and B C(2) a curve of degree two and posit?{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}{"}e self-intersection. We prove that there are no such pairs if g < pa(B) < 2g-1. We study the singularities and self-intersection of any degree two curve in C(2). Moreover, we give examples of curves with arithmetic genus in the Brill-Noether range and positive self-intersection on C × C.",

keywords = "Symmetric product, curve, curves in surfaces, irregular surface",

author = "Meritxell S{\'a}ez",

note = "Publisher Copyright: {\textcopyright} 2018 Walter de Gruyter GmbH Berlin/Boston 2018.",

year = "2018",

month = apr,

day = "25",

doi = "10.1515/advgeom-2017-0046",

language = "English",

volume = "18",

pages = "161--180",

journal = "Advances in Geometry",

issn = "1615-715X",

publisher = "Walter de Gruyter GmbH",

number = "2",

}

TY - JOUR

T1 - Classification of degree two curves in the symmetric square with positive self-intersection

AU - Sáez, Meritxell

PY - 2018/4/25

Y1 - 2018/4/25

N2 - We give a precise classification of the pairs (C, B) with C a smooth curve of genus g and B C(2) a curve of degree two and posit?"""""""""""""""""""""""""""""""""""""""""""""""""""""""""""""e self-intersection. We prove that there are no such pairs if g < pa(B) < 2g-1. We study the singularities and self-intersection of any degree two curve in C(2). Moreover, we give examples of curves with arithmetic genus in the Brill-Noether range and positive self-intersection on C × C.

AB - We give a precise classification of the pairs (C, B) with C a smooth curve of genus g and B C(2) a curve of degree two and posit?"""""""""""""""""""""""""""""""""""""""""""""""""""""""""""""e self-intersection. We prove that there are no such pairs if g < pa(B) < 2g-1. We study the singularities and self-intersection of any degree two curve in C(2). Moreover, we give examples of curves with arithmetic genus in the Brill-Noether range and positive self-intersection on C × C.

KW - Symmetric product

KW - curve

KW - curves in surfaces

KW - irregular surface

UR - https://www.scopus.com/pages/publications/85041426165

U2 - 10.1515/advgeom-2017-0046

DO - 10.1515/advgeom-2017-0046

M3 - Article

AN - SCOPUS:85041426165

SN - 1615-715X

VL - 18

SP - 161

EP - 180

JO - Advances in Geometry

JF - Advances in Geometry

IS - 2

ER -

Classification of degree two curves in the symmetric square with positive self-intersection

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this