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Related papers: Weierstrass points at irregular cusps

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The genus g of an F_{q^2}-maximal curve satisfies g=g_1:=q(q-1)/2 or g\le g_2:= [(q-1)^2/4]. Previously, such curves with g=g_1 or g=g_2, q odd, have been characterized up to isomorphism. Here it is shown that an F_{q^2}-maximal curve with…

Algebraic Geometry · Mathematics 2007-05-23 Miriam Abdon , Fernando Torres

It is a well-known result that a stable curve of compact type over $\mathbb{C}$ having two components is hyperelliptic if and only if both components are hyperelliptic and the point of intersection is a Weierstrass point for each of them.…

Algebraic Geometry · Mathematics 2023-09-06 Juliana Coelho , Frederico Sercio

We prove that there are only finitely many complex numbers $a$ and $b$ with $4a^3+27b^2\not=0$ such that the three points $(1,*),(2,*),$ and $(3,*)$ are simultaneously torsion on the elliptic curve defined in Weierstrass form by…

Number Theory · Mathematics 2011-05-24 Philipp Habegger

Previous results on genera g of F_{q^2}-maximal curves are improved: (1) Either g\leq (q^2-q+4)/6, or g=\lfloor(q-1)^2/4\rfloor, or g=q(q-1)/2; (2) The hypothesis on the existence of a particular Weierstrass point in \cite{at} is proved;…

Algebraic Geometry · Mathematics 2007-05-23 Gabor Korchmaros , Fernando Torres

We prove that there exists an integer p_0 such that X_split(p)(Q) is made of cusps and CM-points for any prime p>p_0. Equivalently, for any non-CM elliptic curve E over Q and any prime p>p_0 the image of the Galois representation induced by…

Number Theory · Mathematics 2009-03-03 Yuri Bilu , Pierre Parent

We study elliptic surfaces over $\mathbb{Q}(T)$ with coefficients of a Weierstrass model being polynomials in $\mathbb{Q}[T]$ with degree at most 2. We derive an explicit expression for their rank over $\mathbb{Q}(T)$ depending on the…

Number Theory · Mathematics 2021-09-03 Francesco Battistoni , Sandro Bettin , Christophe Delaunay

We prove that the average size of the 3-Selmer group of a genus-2 curve with a marked Weierstrass point is 4.

Number Theory · Mathematics 2020-10-28 Beth Romano , Jack A. Thorne

Let $p$ be a prime. We study non-constant morphisms $f:X_0(p)_\mathbb \to Y$, where $Y/\mathbb Q$ is a curve of genus $\geq 2$. We prove that for $p<3000$ such an $f$ of degree $d>1$ must be isomorphic to the quotient map $X_0(p)\to…

Algebraic Geometry · Mathematics 2026-02-12 Maarten Derickx , Petar Orlić

An odd prime $p$ is called irregular with respect to Euler polynomials if it divides the numerator of one of the numbers $$E_1(0),E_{3}(0),\ldots,E_{p-2}(0),$$ where $E_n(x)$ is the $n$-th Euler polynomial. As in the classical case, we link…

Number Theory · Mathematics 2018-09-26 Su Hu , Min-Soo Kim , Min Sha

We give an upper bound on the codimension in $M_{g,1}$ of the variety $M^S_{g,1}$ of marked curves $(C,p)$ with a given Weierstrass semigroup. The bound is a combinatorial quantity which we call the effective weight of the semigroup; it is…

Algebraic Geometry · Mathematics 2021-05-25 Nathan Pflueger

We construct an open substack $U\subset\mathcal{M}_{g,1}$ with the complement of codimension $\ge 2$ and a morphism from $U$ to a weighted projective stack, which sends the Weierstrass locus $\mathcal{W}\cap U$ to a point, and maps…

Algebraic Geometry · Mathematics 2016-11-15 Alexander Polishchuk

Working over an algebraically closed field of arbitrary characteristic we study, for integers $N\geq 2$ and $g\geq 2$, the set of points of order dividing $N$ lying on an irreducible smooth proper curve of genus $g$ embedded in its jacobian…

Algebraic Geometry · Mathematics 2024-01-04 John Boxall

We use Weierstrass Point Theory and Frobenius orders to prove the uniqueness (up to isomorphism) of some optimal curves.

alg-geom · Mathematics 2008-02-03 Rainer Fuhrmann , Fernando Torres

We exhibit a non-varying phenomenon for the counting problem of cylinders, weighted by their area, passing through two marked (regular) Weierstrass points of a translation surface in a hyperelliptic connected component…

Dynamical Systems · Mathematics 2021-11-30 Angel Pardo

We show that three numerical semigroups <5,6,7,8>, <3,7,8 > and <3,5> are of double covering type, i.e., the Weierstrass semigroups of ramification points on double covers of curves. Combining this with the results of Oliveira-Pimentel and…

Algebraic Geometry · Mathematics 2013-11-19 Takeshi Harui , Jiryo Komeda , Akira Ohbuchi

The generic change of the Weierstrass Canonical Form of regular complex structured matrix pencils under generic structure-preserving additive low-rank perturbations is studied. Several different symmetry structures are considered and it is…

Spectral Theory · Mathematics 2019-02-04 Fernando De Terán , Christian Mehl , Volker Mehrmann

We compute the integral Chow rings of the stacks ${\mathcal H}_{g,n}^w$ parametrizing hyperelliptic curves with $n$ marked Weierstrass points. We prove that the integral Chow rings of each of these stacks is generated as an algebra by any…

Algebraic Geometry · Mathematics 2024-08-01 Dan Edidin , Zhengning Hu

In this paper we consider the problem of calculating the higher-order Weierstrass weight of the branch points of a superelliptic curve $C$. For any $q>1$, we give an exact formula for the $q$-weight of an affine branch point. We also find a…

Algebraic Geometry · Mathematics 2017-02-15 Caleb McKinley Shor

Let G be the separable Galois group of a finite field F of characteristic p, and X/F an imaginary hyperelliptic curve such that G acts transitively on its set W(X) of Weierstrass points. The existence of a G-invariant 2-torsion point on the…

Number Theory · Mathematics 2007-05-23 Gunther Cornelissen

We determine the number of cusps of minimal Picard modular surfaces. The proof also counts cusps of other Picard modular surfaces of arithmetic interest. Consequently, for each N > 0 there are finitely many commensurability classes of…

Geometric Topology · Mathematics 2011-07-21 Matthew Stover
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