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Related papers: Enriques involutions and Brauer classes

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Transcendental Brauer elements are notoriously difficult to compute. Work of Wittenberg, and later, Ieronymou, gives a method for computing 2-torsion transcendental classes on surfaces that have a genus 1 fibration with rational 2-torsion…

Algebraic Geometry · Mathematics 2012-02-29 Bianca Viray

Brandhorst and Shimada described a large class of Enriques surfaces, called $(\tau,\overline{\tau})$-generic, for which they gave generators for the automorphism groups and calculated the elliptic fibrations and the smooth rational curves…

Algebraic Geometry · Mathematics 2024-06-05 Riccardo Moschetti , Franco Rota , Luca Schaffler

We consider the class of singular double coverings $X \to \PP^3$ ramified in the degeneration locus $D$ of a family of 2-dimensional quadrics. These are precisely the quartic double solids constructed by Artin and Mumford as examples of…

Algebraic Geometry · Mathematics 2018-09-10 Colin Ingalls , Alexander Kuznetsov

We show that odd order transcendental elements of the Brauer group of a K3 surface can obstruct the Hasse principle. We exhibit a general K3 surface $Y$ of degree 2 over $\mathbb{Q}$ together with a three torsion Brauer class $\alpha$ that…

Algebraic Geometry · Mathematics 2018-08-03 Jennifer Berg , Anthony Várilly-Alvarado

We relate the Brauer group of a Kummer surface to the Brauer group of the corresponding abelian surface. For many pairs of elliptic curves over the rational numbers we prove that the Kummer surface attached to their product has trivial…

Algebraic Geometry · Mathematics 2010-11-09 Alexei N. Skorobogatov , Yuri G. Zarhin

Let X be a minuscule Schubert variety and $\alpha$ a class of 1-cycle on X. In this article we describe the irreducible components of the scheme of morphisms of class $\alpha$ from a rational curve to X. The irreducible components are…

Algebraic Geometry · Mathematics 2007-05-23 Nicolas Perrin

We determine the isomorphism class of the Brauer groups of certain nonrational genus zero extensions of number fields. In particular, for all genus zero extensions E of the rational numbers Q that are split by Q(\sqrt{2}), Br(E) is…

Rings and Algebras · Mathematics 2007-05-23 Jack Sonn , John Swallow

Motivated by a problem originating in string theory, we study elliptic fibrations on K3 surfaces with large Picard number modulo isomorphism. We give methods to determine upper bounds for the number of inequivalent K3 surfaces sharing the…

Algebraic Geometry · Mathematics 2013-12-17 Andreas P. Braun , Yusuke Kimura , Taizan Watari

Let k be a field, and let {\pi}:\tilde{X} -> X be a proper birational morphism of irreducible k-varieties, where \tilde{X} is smooth and X has at worst quotient singularities. When the characteristic of k is zero, a theorem of Koll\'ar in…

Algebraic Geometry · Mathematics 2013-11-26 Indranil Biswas , Amit Hogadi

The three pencils of K3 surfaces of minimal discriminant whose general element covers at least one Enriques surface are Kond\={o}'s pencils I and II, and the Ap\'ery--Fermi pencil. We enumerate and investigate all Enriques surfaces covered…

Algebraic Geometry · Mathematics 2022-11-30 Dino Festi , Davide Cesare Veniani

In this article we explicitly compute equations of an Enriques surface via the involution on a K3 surface. We also discuss its tropicalization and compute the tropical homology, thus recovering a special case of the result of \cite{IKMZ},…

Algebraic Geometry · Mathematics 2017-06-22 Barbara Bolognese , Corey Harris , Joachim Jelisiejew

Let $k$ be a number field. We give an explicit bound, depending only on $[k:\mathbf{Q}]$ and the discriminant of the N\'{e}ron--Severi lattice, on the size of the Brauer group of a K3 surface $X/k$ that is geometrically isomorphic to the…

Number Theory · Mathematics 2022-08-08 Francesca Balestrieri , Alexis Johnson , Rachel Newton

We give an explicit description of the Godeaux surfaces that admit an involution such that the quotient surface is birational to an Enriques surface; these surfaces give a 6-dimensional unirational irreducible subset of the moduli space of…

Algebraic Geometry · Mathematics 2015-02-17 Margarida Mendes Lopes , Rita Pardini

We develop some general tools for computing the Brauer group of a tame algebraic stack $\mathscr X$ by studying the difference between it and the Brauer group of the coarse space $X$ of $\mathscr X$. It is our hope that these tools will be…

Algebraic Geometry · Mathematics 2025-07-22 Niven Achenjang

We consider the reduction of Brauer classes on surfaces over number fields, with a view toward applications to rationality and derived equivalence. We show that a Brauer class on a very general polarized K3 surface over a number field…

Algebraic Geometry · Mathematics 2022-03-08 Sarah Frei , Brendan Hassett , Anthony Várilly-Alvarado

We relate the Brauer group of a smooth variety over a p-adic field to the geometry of the special fibre of a regular model, using the purity theorem in \'etale cohomology. As an illustration, we describe how the Brauer group of a smooth del…

Number Theory · Mathematics 2015-06-12 Martin Bright

The elliptic modular surface of level 4 is a complex K3 surface with Picard number 20. This surface has a model over a number field such that its reduction modulo 3 yields a surface isomorphic to the Fermat quartic surface in characteristic…

Algebraic Geometry · Mathematics 2019-09-12 Ichiro Shimada

We show that transcendental elements of the Brauer group of an algebraic surface can obstruct the Hasse principle. We construct a general K3 surface X of degree 2 over Q, together with a two-torsion Brauer class A that is unramified at…

Number Theory · Mathematics 2011-10-11 Brendan Hassett , Anthony Várilly-Alvarado

We prove that, under certain conditions, the existence of a curve of $(m+2)$-secants to the Kummer variety of an indecomposable principally polarized abelian variety $X$, represents $m$-times the minimal cohomological class in $X$. In the…

Algebraic Geometry · Mathematics 2026-02-10 José Alejandro Aburto

Let $X$ be a K3 surface which doubly covers an Enriques surface $S$. If $n\in\mathbb{N}$ is an odd number, then the Hilbert scheme of $n$-points $X^{[n]}$ admits a natural quotient $S_{[n]}$. This quotient is an Enriques manifold in the…

Algebraic Geometry · Mathematics 2024-03-19 Fabian Reede
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