scholarly journals On the Chow Ring of Cynk–Hulek Calabi–Yau Varieties and Schreieder Varieties

2019 ◽  
Vol 72 (2) ◽  
pp. 505-536 ◽  
Author(s):  
Robert Laterveer ◽  
Charles Vial
Keyword(s):  
Positive Characteristic ◽  
K3 Surfaces ◽  
The Self ◽  
Dimensional Case ◽  
Chern Classes ◽  
Chow Ring ◽  
Cycle Class

AbstractThis note is about certain locally complete families of Calabi–Yau varieties constructed by Cynk and Hulek, and certain varieties constructed by Schreieder. We prove that the cycle class map on the Chow ring of powers of these varieties admits a section, and that these varieties admit a multiplicative self-dual Chow–Künneth decomposition. As a consequence of both results, we prove that the subring of the Chow ring generated by divisors, Chern classes, and intersections of two cycles of positive codimension injects into cohomology via the cycle class map. We also prove that the small diagonal of Schreieder surfaces admits a decomposition similar to that of K3 surfaces. As a by-product of our main result, we verify a conjecture of Voisin concerning zero-cycles on the self-product of Cynk–Hulek Calabi–Yau varieties, and in the odd-dimensional case we verify a conjecture of Voevodsky concerning smash-equivalence. Finally, in positive characteristic, we show that the supersingular Cynk–Hulek Calabi–Yau varieties provide examples of Calabi–Yau varieties with “degenerate” motive.

scholarly journals OBSTRUCTIONS TO ALGEBRAIZING TOPOLOGICAL VECTOR BUNDLES

2019 ◽  
Vol 7 ◽  
Author(s):  
A. ASOK ◽  
J. FASEL ◽  
M. J. HOPKINS
Keyword(s):  
Vector Bundle ◽  
Complex Manifold ◽  
Algebraic Variety ◽  
Vector Bundles ◽  
Necessary Condition ◽  
Chern Classes ◽  
Smooth Complex ◽  
Steenrod Operations ◽  
Complex Algebraic Variety ◽  
Cycle Class

Suppose $X$ is a smooth complex algebraic variety. A necessary condition for a complex topological vector bundle on $X$ (viewed as a complex manifold) to be algebraic is that all Chern classes must be algebraic cohomology classes, that is, lie in the image of the cycle class map. We analyze the question of whether algebraicity of Chern classes is sufficient to guarantee algebraizability of complex topological vector bundles. For affine varieties of dimension ${\leqslant}3$, it is known that algebraicity of Chern classes of a vector bundle guarantees algebraizability of the vector bundle. In contrast, we show in dimension ${\geqslant}4$ that algebraicity of Chern classes is insufficient to guarantee algebraizability of vector bundles. To do this, we construct a new obstruction to algebraizability using Steenrod operations on Chow groups. By means of an explicit example, we observe that our obstruction is nontrivial in general.

scholarly journals Curves of Small Genus on Certain K3 Surfaces

2016 ◽  
Vol 161 (1) ◽  
pp. 103-106
Author(s):  
PETER SWINNERTON–DYER
Keyword(s):  
Quadratic Form ◽  
Rational Point ◽  
Intersection Number ◽  
K3 Surfaces ◽  
The Self ◽  
Density Theorems ◽  
Formula Group ◽  
Zero Values ◽  
Image Position ◽  
Small Genus

Recent workers [1, 3] have proved density theorems about the rational points on K3 surfaces of the form $$ V:\;X_0^4+cX_1^4=X_2^4+cX_3^4 $$ for certain non-zero values of c. Their arguments depend on the presence of at least two pencils of curves of genus 1 on V. Unfortunately the values of c for which the argument works are constrained by the need to exhibit explicitly a rational point on V which satisfies certain extra conditions; these in particular require it to lie outside the four obvious rational lines on V. It is therefore natural to ask whether there are other curves of genus 0 or 1 defined over Q on V. In the case c = 1 there are known to be infinitely many such curves (see [2]), and for general rational c the quadratic form Q on the Néron–Severi group whose value is the self-intersection number takes the values 0 and -2 infinitely often. Naively one might expect the case c = 1 to be typical; but this is not so. The main object of this paper is to prove the following result.

The self-intersection formula and the ‘formule-clef’

1975 ◽  
Vol 78 (1) ◽  
pp. 117-123 ◽  
Author(s):  
A. T. Lascu ◽  
D. Mumford ◽  
D. B. Scott
Keyword(s):  
Ring Homomorphism ◽  
Equivalence Classes ◽  
The Self ◽  
Group Homomorphism ◽  
Closed Field ◽  
Chow Ring ◽  
Algebraically Closed Field ◽  
Rational Equivalence ◽  
Image Position ◽  
Intersection Formula

We shall consider exclusively algebraic non-singular quasi-projective irreducible varieties over an algebraically closed field. If V is such a variety will be the Chow ring of rational equivalence classes of cycles of Vand the group homomorphism defined by any proper morphism φ: V1 → V2. Alsodenotes the ring homomorphism defined by φ.

Sign in / Sign up

Export Citation Format

Share Document