Your search keyword '"Cox ring"' showing total 175 results

1. Algebra and geometry of irreducible toric vector bundles of rank n on [formula omitted].

Author

George, Courtney and Manon, Christopher

Subjects

*ALGEBRA, *LOGICAL prediction, *GEOMETRY, *VECTOR bundles, *TORIC varieties

Abstract

We construct a presentation for the Cox ring of the projectivization P E of any rank n irreducible toric vector bundle on P n. We use this presentation to show that P E always satisfies Fujita's freeness and ampleness conjectures. [ABSTRACT FROM AUTHOR]

Published

2024

2. Klyachko Diagrams of Monomial Ideals.

Author

Miró-Roig, Rosa M. and Salat-Moltó, Marti

Abstract

In this paper, we introduce the notion of a Klyachko diagram for a monomial ideal I in a certain multi-graded polynomial ring, namely the Cox ring R of a smooth complete toric variety, with irrelevant maximal ideal B. We present procedures to compute the Klyachko diagram of I from its monomial generators, and to retrieve the B −saturation Isat of I from its Klyachko diagram. We use this description to compute the first local cohomology module H B 1 (I) . As an application, we find a formula for the Hilbert function of Isat, and a characterization of monomial ideals with constant Hilbert polynomial, in terms of their Klyachko diagram. [ABSTRACT FROM AUTHOR]

Published

2023

3. Some necessary and sufficient condition for finite generation of symbolic Rees rings.

Author

Inagawa, Taro and Kurano, Kazuhiko

Subjects

*FINITE, The, *ORBITS (Astronomy)

Abstract

Consider the blow-up Y of a weighted projective plane at a point in the open orbit over a field of characteristic 0. We assume that there exists a curve C on Y such that C 2 < 0 and C. E = 1 , where E is the exceptional curve. In this paper we give a (very simple) necessary and sufficient condition for finite generation of the Cox ring of Y (Theorem 1.2). It is an affirmative answer to a conjecture due to He and Kurano-Nishida. [ABSTRACT FROM AUTHOR]

Published

2023

4. On uniqueness of additive actions on complete toric varieties.

Author

Dzhunusov, Sergey

Subjects

*TORIC varieties, *ADDITIVES

Published

2022

5. Equations of negative curves of blow-ups of Ehrhart rings of rational convex polygons.

Author

Kurano, Kazuhiko

Subjects

*FINITE rings, *POLYNOMIAL rings, *PRIME ideals, *POLYGONS, *EQUATIONS, *TORIC varieties

Abstract

Finite generation of the symbolic Rees ring of a space monomial prime ideal of a 3-dimensional weighted polynomial ring is a very interesting problem. Negative curves play important roles in finite generation of these rings. We are interested in the structure of the negative curve. We shall prove that negative curves are rational in many cases. We also see that the Cox ring of the blow-up of a toric variety at the point (1 , 1 , ... , 1) coincides with the extended symbolic Rees ring of an ideal of a polynomial ring. For example, Roberts' second counterexample to Cowsik's question (and Hilbert's 14th problem) coincides with the Cox ring of some normal projective variety (Remark 2.7). [ABSTRACT FROM AUTHOR]

Published

2022

6. Cox Rings of Trinomial Hypersurfaces.

Author

Kruglov, O. K.

Subjects

*HYPERSURFACES, *ALGORITHMS, *TORUS

Abstract

A criterion for the total coordinate space of a trinomial hypersurface to be a hypersurface is found. An algorithm for calculating the Cox ring in explicit form is proposed, and criteria for the total coordinate space to be rational and factorial are obtained. [ABSTRACT FROM AUTHOR]

Published

2021

7. Additive actions on complete toric surfaces.

Author

Dzhunusov, Sergey

Subjects

*ABELIAN groups, *ALGEBRAIC varieties, *TORIC varieties

Abstract

By an additive action on an algebraic variety X we mean a regular effective action 𝔾 a n × X → X with an open orbit of the commutative unipotent group  𝔾 a n . In this paper, we give a classification of additive actions on complete toric surfaces. [ABSTRACT FROM AUTHOR]

Published

2021

8. Commutative algebraic monoid structures on affine surfaces.

Author

Dzhunusov, Sergey and Zaitseva, Yulia

Subjects

*SURFACE structure, *AFFINAL relatives, *TORIC varieties

Abstract

We classify commutative algebraic monoid structures on normal affine surfaces over an algebraically closed field of characteristic zero. The answer is given in two languages: comultiplications and Cox coordinates. The result follows from a more general classification of commutative monoid structures of rank 0, n − 1 or 𝑛 on a normal affine variety of dimension 𝑛. [ABSTRACT FROM AUTHOR]

Published

2021

9. Commutative algebraic monoid structures on affine spaces.

Author

Arzhantsev, Ivan, Bragin, Sergey, and Zaitseva, Yulia

Subjects

*TORIC varieties, *MONOIDS, *POLYNOMIALS, *ALGEBRA

Abstract

We study commutative associative polynomial operations 𝔸 n × 𝔸 n → 𝔸 n with unit on the affine space 𝔸 n over an algebraically closed field of characteristic zero. A classification of such operations is obtained up to dimension 3. Several series of operations are constructed in arbitrary dimension. Also we explore a connection between commutative algebraic monoids on affine spaces and additive actions on toric varieties. [ABSTRACT FROM AUTHOR]

Published

2020

10. Embedding non-projective Mori dream space.

Author

Rossi, Michele

Abstract

This paper is devoted to extend some Hu–Keel results on Mori dream spaces (MDS) beyond the projective setup. Namely, Q -factorial algebraic varieties with finitely generated class group and Cox ring, here called weak Mori dream spaces (wMDS), are considered. Conditions guaranteeing the existence of a neat embedding of a (completion of a) wMDS into a complete toric variety are studied, showing that, on the one hand, those which are complete and admitting low Picard number are always projective, hence Mori dream spaces in the sense of Hu–Keel. On the other hand, an example of a wMDS that does not admit any neat embedded sharp completion (i.e. Picard number preserving) into a complete toric variety is given, on the contrary of what Hu and Keel exhibited for a MDS. Moreover, termination of the Mori minimal model program for every divisor and a classification of rational contractions for a complete wMDS are studied, obtaining analogous conclusions as for a MDS. Finally, we give a characterization of wMDS arising from a small Q -factorial modification of a projective weak Q -Fano variety. [ABSTRACT FROM AUTHOR]

Published

2020

11. TOWARDS CLASSIFYING TORIC DEGENERATIONS OF CUBIC SURFACES.

Author

DONTEN-BURY, MARIA, GÖRLACH, PAUL, and WROBEL, MILENA

Subjects

RING theory, TORIC varieties

Abstract

We investigate the class of degenerations of smooth cubic surfaces which are obtained from degenerating their Cox rings to toric algebras. More precisely, we work in the spirit of Sturmfels and Xu who use the theory of Khovanskii bases to determine toric degenerations of Del Pezzo surfaces of degree 4 and who leave the question of classifying these degenerations in the degree 3 case as an open problem. In order to carry out this classification we describe an approach which is closely related to tropical geometry and present partial results in this direction. [ABSTRACT FROM AUTHOR]

Published

2020

12. Atom spectra of graded rings and sheafification in toric geometry.

Author

Posur, Sebastian

Subjects

*ATOMIC spectra, *TORIC varieties, *ABELIAN categories, *NOETHERIAN rings, *TOPOLOGICAL spaces, *GEOMETRY

Abstract

We prove that the atom spectrum, which is a topological space associated to an arbitrary abelian category introduced by Kanda, of the category of finitely presented graded modules over a noetherian graded ring R is given as a union of the homogeneous spectrum of R with some additional points, which we call non-standard points. This description of the atom spectrum helps in understanding the sheafification process in toric geometry: if S is the Cox ring of a normal toric variety X without torus factors, then a finitely presented graded S -module sheafifies to zero if and only if its atom support consists only of points in the atom spectrum of S which either lie in the vanishing locus of the irrelevant ideal of X or are non-standard. [ABSTRACT FROM AUTHOR]

Published

2019

13. Examples of Mori dream surfaces of general type with pg = 0.

Author

Keum, JongHae and Lee, Kyoung-Seog

Subjects

*MINIMAL surfaces, *CONES

Abstract

Abstract In this paper we study effective, nef and semiample cones of minimal surfaces of general type with p g = 0. We provide examples of minimal surfaces of general type with p g = 0 and 2 ≤ K 2 ≤ 9 which are Mori dream spaces. On these examples we also give explicit description of their effective cones with all negative curves. We also present non-minimal surfaces of general type with p g = 0 that are not Mori dream surfaces. [ABSTRACT FROM AUTHOR]

Published

2019

14. Cox rings and algebraic maps.

Author

Mańdziuk, Tomasz

Subjects

*FINITE groups, *SHEAF theory, *MORPHISMS (Mathematics), *ALGEBRA, *MATHEMATICAL analysis

Abstract

Given a morphism F:X→Y from a Mori Dream Space X to a smooth Mori Dream Space Y and quasicoherent sheaves F on X and G on Y, we describe the inverse image of G by F and the direct image of F by F in terms of the corresponding modules over the Cox rings graded in the class groups. [ABSTRACT FROM AUTHOR]

Published

2019

15. INVARIANT SUBRING OF THE COX RING OF K3 SURFACES.

Author

AKIYOSHI SANNAI

Subjects

AUTOMORPHISM groups, AUTOMORPHISMS, GROUP rings

Abstract

In this paper, we consider the invariant subring of the Cox ring by the automorphism group of the projective variety X under some assumption. We prove that the ring is finitely generated if X is a K3 surface. [ABSTRACT FROM AUTHOR]

Published

2019

16. Flexible affine cones and flexible coverings.

Author

Michałek, Mateusz, Perepechko, Alexander, and Süß, Hendrik

Abstract

We provide a new criterion for flexibility of affine cones over varieties covered by flexible affine varieties. We apply this criterion to prove flexibility of affine cones over secant varieties of Segre-Veronese embeddings and over certain Fano threefolds. We further prove flexibility of total coordinate spaces of Cox rings of del Pezzo surfaces. [ABSTRACT FROM AUTHOR]

Published

2018

17. Equations of negative curves of blow-ups of Ehrhart rings of rational convex polygons

Author

Kazuhiko Kurano

Subjects

Pure mathematics, Monomial, Ring (mathematics), Algebra and Number Theory, Mathematics::Commutative Algebra, Polynomial ring, Prime ideal, Toric variety, Mathematics - Commutative Algebra, Commutative Algebra (math.AC), Mathematics - Algebraic Geometry, FOS: Mathematics, Ideal (ring theory), Algebraic Geometry (math.AG), 13A30, 14M25, Cox ring, Projective variety, Mathematics

Abstract

Finite generation of the symbolic Rees ring of a space monomial prime ideal of a 3-dimensional weighted polynomial ring is a very interesting problem. Negative curves play important roles in finite generation of these rings. We are interested in the structure of the negative curve. We shall prove that negative curves are rational in many cases. We also see that the Cox ring of the blow-up of a toric variety at the point (1,1,...,1) coincides with the extended symbolic Rees ring of an ideal of a polynomial ring. For example, Roberts' second counterexample to Cowsik's question (and Hilbert's 14th problem) coincides with the Cox ring of some normal projective variety., Comment: 24 pages

Published

2022

18. Homological and combinatorial aspects of virtually Cohen–Macaulay sheaves

Author

Jay Yang, Michael C. Loper, Christine Berkesch, and Patricia Klein

Subjects

13D02, Computer science, General Mathematics, Structure (category theory), Vector bundle, Commutative Algebra (math.AC), 01 natural sciences, Constructive, Mathematics - Algebraic Geometry, 0103 physical sciences, FOS: Mathematics, QA1-939, 05E40, Mathematics - Combinatorics, 0101 mathematics, Algebraic number, 13F55 (primary), Algebraic Geometry (math.AG), 14M25 (secondary), Mathematics::Commutative Algebra, 010102 general mathematics, Graded ring, Toric variety, Mathematics - Commutative Algebra, 16. Peace & justice, Algebra, Product (mathematics), Combinatorics (math.CO), 010307 mathematical physics, 13D02 (Primary), 14M25, 13F55, 05E40 (Secondary), Cox ring, Mathematics

Abstract

When studying a graded module $M$ over the Cox ring of a smooth projective toric variety $X$, there are two standard types of resolutions commonly used to glean information: free resolutions of $M$ and vector bundle resolutions of its sheafification. Each approach comes with its own challenges. There is geometric information that free resolutions fail to encode, while vector bundle resolutions can resist study using algebraic and combinatorial techniques. Recently, Berkesch, Erman, and Smith introduced virtual resolutions, which capture desirable geometric information and are also amenable to algebraic and combinatorial study. The theory of virtual resolutions includes a notion of a virtually Cohen--Macaulay property, though tools for assessing which modules are virtually Cohen--Macaulay have only recently started to be developed. In this paper, we continue this research program in two related ways. The first is that, when $X$ is a product of projective spaces, we produce a large new class of virtually Cohen--Macaulay Stanley--Reisner rings, which we show to be virtually Cohen--Macaulay via explicit constructions of appropriate virtual resolutions reflecting the underlying combinatorial structure. The second is that, for an arbitrary smooth projective toric variety $X$, we develop homological tools for assessing the virtual Cohen--Macaulay property. Some of these tools give exclusionary criteria, and others are constructive methods for producing suitably short virtual resolutions. We also use these tools to establish relationships among the arithmetically, geometrically, and virtually Cohen--Macaulay properties., Accepted to Transactions of the London Mathematical Society

Published

2021

19. Maps of Mori Dream Spaces in Cox coordinates Part I: existence of descriptions.

Author

Buczyński, J. and Kędzierski, O.

Subjects

*COORDINATES, *AFFINAL relatives, *PROJECTIVE spaces, *MORPHISMS (Mathematics), *FINITE element method

Abstract

Abstract: Any rational map between affine spaces, projective spaces or toric varieties can be described in terms of their affine, homogeneous, or Cox coordinates. We show an analogous statement in the setting of Mori Dream Spaces. More precisely (in the case of regular maps) we show that there exists a finite extension of the Cox ring of the source, such that the regular map lifts to a morphism from the Cox ring of the target to the finite extension. Moreover the extension only involves roots of homogeneous elements. Such a description of the map can be applied in practical computations. [ABSTRACT FROM AUTHOR]

Published

2018

20. Smooth Fano Intrinsic Grassmannians of Type 2,n with Picard Number Two

Author

Muhammad Imran Qureshi and Milena Wrobel

Subjects

Pure mathematics, Conjecture, Mathematics::Commutative Algebra, 14J45, 14M15, General Mathematics, Fano plane, Type (model theory), Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Grassmannian, FOS: Mathematics, Ideal (ring theory), Mathematics::Representation Theory, Algebraic Geometry (math.AG), Cox ring, Projective variety, Mathematics

Abstract

We introduce the notion of intrinsic Grassmannians which generalizes the well known weighted Grassmannians. An intrinsic Grassmannian is a normal projective variety whose Cox ring is defined by the Pl\"ucker ideal $I_{d,n}$ of the Grassmannian $\mathrm{Gr}(d,n)$. We give a complete classification of all smooth Fano intrinsic Grassmannians of type $(2,n)$ with Picard number two and prove an explicit formula to compute the total number of such varieties for an arbitrary $n$. We study their geometry and show that they satisfy Fujita's freeness conjecture., Comment: 19 pages

Published

2021

21. Cox Rings of Trinomial Hypersurfaces

Author

O. K. Kruglov

Subjects

Factorial, Pure mathematics, Mathematics::Algebraic Geometry, Hypersurface, Mathematics::Commutative Algebra, Mathematics::Complex Variables, General Mathematics, Mathematics::Differential Geometry, Coordinate space, Trinomial, Cox ring, Mathematics

Abstract

A criterion for the total coordinate space of a trinomial hypersurface to be a hypersurface is found. An algorithm for calculating the Cox ring in explicit form is proposed, and criteria for the total coordinate space to be rational and factorial are obtained.

Published

2021

22. Cox rings of K3 surfaces of Picard number three

Author

Claudia Correa Deisler, Michela Artebani, and Antonio Laface

Subjects

Pure mathematics, Algebra and Number Theory, Mathematics::Commutative Algebra, Type (model theory), K3 surface, Mathematics - Algebraic Geometry, Elliptic curve, Cone (topology), Hilbert basis, FOS: Mathematics, Generating set of a group, Algebraic Geometry (math.AG), Cox ring, Mathematics

Abstract

Let X be a projective K3 surface over C . We prove that its Cox ring has a generating set whose degrees are either classes of smooth rational curves, sums of at most three elements of the Hilbert basis of the nef cone, or of the form 2 ( f + f ′ ) , where f , f ′ are classes of smooth elliptic curves with f ⋅ f ′ = 2 . This result and techniques using Koszul's type exact sequences are then applied to determine a generating set for the Cox ring of all Mori dream K3 surfaces of Picard number three which is minimal in most cases. A presentation for the Cox ring is given in some special cases with few generators.

Published

2021

23. LOG FANO STRUCTURES AND COX RINGS OF BLOW-UPS OF PRODUCTS OF PROJECTIVE SPACES.

Author

LESIEUTRE, JOHN and JINHYUNG PARK

Subjects

*PROJECTIVE spaces, *PROJECTIVE geometry, *SMALL divisors, *DIFFERENTIABLE dynamical systems, *CONFIGURATIONS (Geometry)

Abstract

The aim of this paper is twofold. First, we determine which blowups of products of projective spaces at general points are varieties of Fano type, and give boundary divisors making these spaces log Fano pairs. Second, we describe generators of the Cox rings of some cases. [ABSTRACT FROM AUTHOR]

Published

2017

24. Hilbert functions of Cox rings of del Pezzo surfaces.

Author

Park, Jinhyung and Won, Joonyeong

Subjects

*HILBERT functions, *SYZYGIES (Mathematics), *COMPUTATIONAL geometry, *PICARD groups, *LATTICE theory

Abstract

To study syzygies of the Cox rings of del Pezzo surfaces, we calculate important syzygetic invariants such as the Hilbert functions, the Green–Lazarsfeld indices, the projective dimensions, and the Castelnuovo–Mumford regularities. Using these computations as well as the natural multigrading structures by the Picard groups of del Pezzo surfaces and Weyl group actions on Picard lattices, we determine the Betti diagrams of the Cox rings of del Pezzo surfaces of degree at most four. [ABSTRACT FROM AUTHOR]

Published

2017

25. ADDITIVE ACTIONS ON TORIC VARIETIES.

Author

ARZHANTSEV, IVAN and ROMASKEVICH, ELENA

Subjects

*ALGEBRAIC varieties, *BIJECTIONS, *ABELIAN groups, *DIMENSION theory (Algebra), *ISOMORPHISM (Mathematics)

Abstract

By an additive action on an algebraic variety X of dimension n we mean a regular action Gan × X → X with an open orbit of the commutative unipotent group Gan. We prove that if a complete toric variety X admits an additive action, then it admits an additive action normalized by the acting torus. Normalized additive actions on a toric variety X are in bijection with complete collections of Demazure roots of the fan SX. Moreover, any two normalized additive actions on X are isomorphic. [ABSTRACT FROM AUTHOR]

Published

2017

26. Non-complete rational T-varieties of complexity one.

Author

Hausen, Jürgen and Wrobel, Milena

Subjects

*COMPUTATIONAL complexity, *VARIETIES (Universal algebra), *TORUS, *ALGEBRAIC equations, *COMBINATORICS

Abstract

We consider rational varieties with a torus action of complexity one and extend the combinatorial approach via the Cox ring developed for the complete case in earlier work to the non-complete, e.g. affine, case. This includes in particular a description of all factorially graded affine algebras of complexity one with only constant homogeneous invertible elements in terms of canonical generators and relations. [ABSTRACT FROM AUTHOR]

Published

2017

27. Computing resolutions of quotient singularities.

Author

Donten-Bury, Maria and Keicher, Simon

Subjects

*MATHEMATICAL singularities, *ALGORITHMS, *GEOMETRY, *DIMENSIONS, *MATHEMATICAL analysis

Abstract

Let G ⊆ GL ( n ) be a finite group without pseudo-reflections. We present an algorithm to compute and verify a candidate for the Cox ring of a resolution X → C n / G , which is based just on the geometry of the singularity C n / G , without further knowledge of its resolutions. We explain the use of our implementation of the algorithms in Singular . As an application, we determine the Cox rings of resolutions X → C 3 / G for all G ⊆ GL ( 3 ) with the aforementioned property and of order | G | ≤ 12 . We also provide examples in dimension 4. [ABSTRACT FROM AUTHOR]

Published

2017

28. On orbits of the automorphism group on an affine toric variety

Author

Arzhantsev Ivan and Bazhov Ivan

Subjects

14m25, 14r20, 14j50, 14l30, toric variety, cox ring, automorphism, quotient, luna stratification, Mathematics, QA1-939

Published

2013

29. Balanced complexes and effective divisors on M¯0,n

Author

José Luis González, Elijah Gunther, and Olivia Zhang

Subjects

Algebra and Number Theory, Mathematics::Commutative Algebra, 010102 general mathematics, 010103 numerical & computational mathematics, Exceptional divisor, 01 natural sciences, Moduli space, Combinatorics, Simplicial complex, Section (category theory), Homogeneous, Bijection, 0101 mathematics, Cox ring, Mathematics

Abstract

Doran, Giansiracusa, and Jensen showed a bijection between homogeneous elements in the Cox ring of M¯0,n not divisible by any exceptional divisor section, and weighted pure-dimensional simplicial c...

Published

2020

30. Cox rings of du Val singularities

Author

Laura Facchini, Victor González-Alonso, and Michał Lasoń

Subjects

Cox ring, du Val singularities, Mathematics, QA1-939

Abstract

In this note we introduce Cox rings of singularities and explicitly compute them in the case of du Val singularities Dn , E6 , E7 and E8 .

Published

2011

31. Etude de certaines familles de variétés algébriques munies d'une action de groupe algébrique

Author

Terpereau, Ronan, Institut de Mathématiques de Bourgogne [Dijon] (IMB), Centre National de la Recherche Scientifique (CNRS)-Université de Franche-Comté (UFC), Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université de Bourgogne (UB), Université Bourgogne - Franche-Comté, Frédéric Déglise, and Terpereau, Ronan

Subjects

groupe de Cremona, structure réelle équivariante, [MATH.MATH-AG] Mathematics [math]/Algebraic Geometry [math.AG], variétés de complexité un, théorie de Mori, Cremona group, Mori theory, Actions de groupes algébriques, théorie de Luna-Vust, complexity-one varieties, Algebraic group actions, anneau de Cox, equivariant real structure, Luna-Vust theory, [MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG], Cox ring

Published

2021

32. On Fano and Calabi-Yau varieties with hypersurface Cox rings

Author

Mauz, Christian and Hausen, Jürgen (Prof. Dr.)

Subjects

Mathematics::Commutative Algebra, Calabi-Yau-Varietät, Klassifikation, Fano variety, Algebraische Geometrie, Fano-Varietät, Mathematics::Algebraic Geometry, classification, combinatorics, Calabi-Yau variety, Kombinatorik, Cox ring, Mathematics::Symplectic Geometry, Coxring

Abstract

This thesis contributes to the explicit classification of Fano and Calabi-Yau varieties. First, we deal with complete intersections in projective toric varieties that arise from a non-degenerate system of Laurent polynomials. Here we obtain Bertini type statements on canonical and terminal singularities. This enables us to classify all non-toric terminal Fano threefolds that arise as a general complete intersection in a fake weighted projective space. The second chapter is devoted to the classification of all smooth Fano fourfolds of Picard number two that have a general hypersurface Cox ring. Using the Cox ring based description of these varieties we investigate their birational geometry and compute Hodge numbers. Moreover, we present a toolbox for constructing examples of general hypersurface Cox rings including several factoriality criteria for graded hypersurface rings. Finally, we give classification results on smooth Calabi-Yau threefolds of Picard number one and two that have a general hypersurface Cox ring.

Published

2021

33. COX RINGS OF RATIONAL SURFACES AND REDUNDANT BLOW-UPS.

Author

DONGSEON HWANG and JINHYUNG PARK

Subjects

*BLOWING up (Algebraic geometry), *PICARD number, *MORPHISMS (Mathematics), *HYPOTHESIS, *CANONICAL transformations

Abstract

We prove that the redundant blow-up preserves the finite generation of the Cox ring of a rational surface under a suitable assumption, and we study the birational structure of Mori dream rational surfaces via redundant blow-ups. It turns out that the redundant blow-up completely characterizes birational morphisms of Mori dream rational surfaces with anticanonical Iitaka dimension 0. As an application, we construct new Mori dream rational surfaces with anticanonical Iitaka dimension 0 and -8 of arbitrarily large Picard number. [ABSTRACT FROM AUTHOR]

Published

2016

34. Tropicalization of del Pezzo surfaces.

Author

Ren, Qingchun, Shaw, Kristin, and Sturmfels, Bernd

Subjects

*HYPERPLANES, *WEYL groups, *TROPICAL geometry, *CUBIC surfaces, *POLYGONS, *PETERSEN graphs

Abstract

We determine the tropicalizations of very affine surfaces over a valued field that are obtained from del Pezzo surfaces of degree 5, 4 and 3 by removing their ( − 1 ) -curves. On these tropical surfaces, the boundary divisors are represented by trees at infinity. These trees are glued together according to the Petersen, Clebsch and Schläfli graphs, respectively. There are 27 trees on each tropical cubic surface, attached to a bounded complex with up to 73 polygons. The maximal cones in the 4-dimensional moduli fan reveal two generic types of such surfaces. [ABSTRACT FROM AUTHOR]

Published

2016

35. The cone of curves and the Cox ring of rational surfaces given by divisorial valuations.

Author

Galindo, C. and Monserrat, F.

Subjects

*CURVES, *RING theory, *GEOMETRIC surfaces, *DIVISOR theory, *GRAPH labelings, *ALGEBRAIC field theory

Abstract

We consider surfaces X defined by plane divisorial valuations ν of the quotient field of the local ring R at a closed point p of the projective plane P 2 over an arbitrary algebraically closed field k and centered at R . We prove that the regularity of the cone of curves of X is equivalent to the fact that ν is non-positive on O P 2 ( P 2 ∖ L ) , where L is a certain line containing p . Under these conditions, we characterize when the characteristic cone of X is closed and its Cox ring finitely generated. Equivalent conditions to the fact that ν is negative on O P 2 ( P 2 ∖ L ) ∖ k are also given. [ABSTRACT FROM AUTHOR]

Published

2016

36. On a family of negative curves

Author

José Luis González, Javier González Anaya, and Kalle Karu

Subjects

Class (set theory), Pure mathematics, Algebra and Number Theory, Mathematics::Commutative Algebra, 010102 general mathematics, Divisor (algebraic geometry), Mathematics - Commutative Algebra, Commutative Algebra (math.AC), 01 natural sciences, Mathematics - Algebraic Geometry, 14C20, 14E30, 14M25 (Primary) 13A30, 14J25, 52B05, 52B20 (Secondary), 0103 physical sciences, FOS: Mathematics, Point (geometry), 010307 mathematical physics, Finitely-generated abelian group, Projective plane, 0101 mathematics, Algebraic Geometry (math.AG), Cox ring, Mathematics

Abstract

Let $X$ be the blowup of a weighted projective plane at a general point. We study the problem of finite generation of the Cox ring of $X$. Generalizing examples of Srinivasan and Kurano-Nishida, we consider examples of $X$ that contain a negative curve of the class $H-mE$, where $H$ is the class of a divisor pulled back from the weighted projective plane and $E$ is the class of the exceptional curve. For any $m>0$ we construct examples where the Cox ring is finitely generated and examples where it is not., 19 pages, 9 figures

Published

2019

37. Algebraic geometric codes on minimal Hirzebruch surfaces

Author

Jade Nardi, Institut de Mathématiques de Toulouse UMR5219 (IMT), Institut National des Sciences Appliquées - Toulouse (INSA Toulouse), Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Université Toulouse 1 Capitole (UT1), Université Fédérale Toulouse Midi-Pyrénées-Université Fédérale Toulouse Midi-Pyrénées-Université Toulouse - Jean Jaurès (UT2J)-Université Toulouse III - Paul Sabatier (UT3), Université Fédérale Toulouse Midi-Pyrénées-Centre National de la Recherche Scientifique (CNRS), Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Université Toulouse 1 Capitole (UT1)-Université Toulouse - Jean Jaurès (UT2J)-Université Toulouse III - Paul Sabatier (UT3), Université Fédérale Toulouse Midi-Pyrénées-Université Fédérale Toulouse Midi-Pyrénées-Centre National de la Recherche Scientifique (CNRS), Université Toulouse Capitole (UT Capitole), Université de Toulouse (UT)-Université de Toulouse (UT)-Institut National des Sciences Appliquées - Toulouse (INSA Toulouse), Institut National des Sciences Appliquées (INSA)-Université de Toulouse (UT)-Institut National des Sciences Appliquées (INSA)-Université Toulouse - Jean Jaurès (UT2J), Université de Toulouse (UT)-Université Toulouse III - Paul Sabatier (UT3), and Université de Toulouse (UT)-Centre National de la Recherche Scientifique (CNRS)

Subjects

FOS: Computer and information sciences, Code (set theory), Pure mathematics, Computer Science - Information Theory, 14G15, 14M25 Hirzebruch surface, Commutative Algebra (math.AC), 01 natural sciences, Upper and lower bounds, 14G50, Mathematics - Algebraic Geometry, Algebraic Geometric code, 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Algebraic Geometry (math.AG), Mathematics, Algebra and Number Theory, Information Theory (cs.IT), Hirzebruch surface, 010102 general mathematics, Minimum distance, [MATH.MATH-IT]Mathematics [math]/Information Theory [math.IT], Mathematics - Commutative Algebra, 16. Peace & justice, Linear code, 13P25, Finite field, Algebraic geometric, AMS classication : 94B27, Rational scroll, [MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG], 010307 mathematical physics, Gröbner basis, Error-correcting codes, Cox ring

Abstract

We define a linear code $C_\eta(\delta_T,\delta_X)$ by evaluating polynomials of bidegree $(\delta_T,\delta_X)$ in the Cox ring on $\mathbb{F}_q$-rational points of the Hirzebruch surface of parameter $\eta$ on the finite field $\mathbb{F}_q$. We give explicit parameters of the code, notably using Gr\"obner bases. The minimum distance provides an upper bound of the number of $\mathbb{F}_q$-rational points of a non-filling curve on a Hirzebruch surface., Comment: Revised version [11/2018]

Published

2019

38. On Intrinsic Quadrics

Author

Anne Fahrner and Juergen Hausen

Subjects

Pure mathematics, Quadric, Conjecture, Mathematics::Commutative Algebra, Fujita scale, General Mathematics, 010102 general mathematics, 14J10, 14J45, 14C20, Quadratic relation, Fano variety, Fano plane, 01 natural sciences, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Algebraic Geometry (math.AG), Cox ring, Projective variety, Mathematics

Abstract

An intrinsic quadric is a normal projective variety with a Cox ring defined by a single quadratic relation. We provide explicit descriptions of these varieties in the smooth case for small Picard numbers. As applications, we figure out in this setting the Fano examples and (affirmatively) test Fujita's base point free conjecture., 31 pages, references added

Published

2019

39. Embedding non-projective Mori dream space

Author

Rossi, M, Rossi, Michele, Rossi, M, and Rossi, Michele

Abstract

This paper is devoted to extend some Hu–Keel results on Mori dream spaces (MDS) beyond the projective setup. Namely, Q-factorial algebraic varieties with finitely generated class group and Cox ring, here called weak Mori dream spaces (wMDS), are considered. Conditions guaranteeing the existence of a neat embedding of a (completion of a) wMDS into a complete toric variety are studied, showing that, on the one hand, those which are complete and admitting low Picard number are always projective, hence Mori dream spaces in the sense of Hu–Keel. On the other hand, an example of a wMDS that does not admit any neat embedded sharp completion (i.e. Picard number preserving) into a complete toric variety is given, on the contrary of what Hu and Keel exhibited for a MDS. Moreover, termination of the Mori minimal model program for every divisor and a classification of rational contractions for a complete wMDS are studied, obtaining analogous conclusions as for a MDS. Finally, we give a characterization of wMDS arising from a small Q-factorial modification of a projective weak Q-Fano variety.

Published

2020

40. On embeddings of Mori dream spaces.

Author

Levitt, John

Abstract

General criteria are given for when an embedding of a Mori dream space into another satisfies certain nice combinatorial conditions on some of their associated cones. An explicit example of such an embedding is studied, specifically how a non-toric del Pezzo surface embeds into a toric variety in this manner. [ABSTRACT FROM AUTHOR]

Published

2014

41. The Cox ring of a spherical embedding.

Author

Gagliardi, Giuliano

Subjects

*EMBEDDINGS (Mathematics), *GROUP algebras, *HOMOGENEOUS spaces, *SET theory, *NUMERICAL solutions to equations, *MATHEMATICAL analysis

Abstract

Abstract: Let G be a connected reductive group and a spherical homogeneous space. We show that the ideal of relations between a natural set of generators of the Cox ring of a G-embedding of can be obtained by homogenizing certain equations which depend only on the homogeneous space. Using this result, we describe some examples of spherical homogeneous spaces such that the Cox ring of any of their G-embeddings is defined by one equation. [Copyright &y& Elsevier]

Published

2014

42. Platonic Harbourne-Hirschowitz Rational Surfaces

Author

Brenda Leticia De La Rosa-Navarro, Mustapha Lahyane, and Juan Bosco Frías-Medina

Subjects

Monoid, Surface (mathematics), Pure mathematics, Mathematics::Algebraic Geometry, Rational surface, General Mathematics, Divisor (algebraic geometry), Projective plane, Singular point of a curve, Algebraically closed field, Cox ring, Mathematics

Abstract

The aim of this work was to study the finite generation of the effective monoid and Cox ring of a Platonic Harbourne-Hirschowitz rational surface with an anticanonical divisor not reduced which contains some exceptional curves as irreducible components. Such surfaces are obtained as the blow up of the n-Hirzebruch surface at any number of points lying in the union of the negative section and $$n+2$$ different fibers. Moreover, the procedure that ensures the finite generation of the effective monoid provides a technique for explicit computation of the minimal generating set for such monoid in concrete cases. As an application, we present explicitly the minimal generating set for the effective monoid of some surfaces which are obtained by considering a degenerate cubic consisting in three lines intersecting at one point in the projective plane and blowing-up the singular point and some ordinary and infinitely near points. The base field of our surfaces is assumed to be algebraically closed of arbitrary characteristic.

Published

2020

43. Quotient Presentations of Mori Dream Spaces

Author

Braun, Lukas Maximilian and Hausen, Jürgen (Prof. Dr.)

Subjects

Cox-Ring, Mathematics::Commutative Algebra, Iteration von Cox-Ringen, vollständiger Durchschnitt, Invariantenring, Kovarianten, Algebraische Geometrie , Birationale Geometrie , Quotient , Invariantentheorie, iteration of Cox rings, klt Singularität, Varietät vom Fano Typ, special linear group, covariants, canonical singularity, ring of invariants, kanonische Singularität, klt singularity, Mori Dream Space, variety of Fano type, Spezielle lineare Gruppe, Cox ring, Gorenstein, complete intersection

Abstract

In the present thesis, we investigate quotient presentations of Mori Dream Spaces. In the first part, we show that varieties of Fano type and klt quasicones have finite iteration of Cox rings with factorial canonical master Cox ring. The variety can be presented as a quotient of the maximal spectrum of this ring by a solvable reductive group. The second part aims to present such factorial canonical rings as invariant rings of the special linear group over the complex numbers. We develop several algorithms to compute such invariants. In particular, we determine invariants in dimensions four and five for arbitrary sums of fundamental representations. Moreover, we complete the classification of complete intersection invariant rings of the special linear group. In the third part of the thesis, we classify compound du Val and canonical threefold singularities with a good two-torus action and we determine their tree of Cox ring iterations. In the last part, we give an outlook of how these different quotient presentations can possibly be combined.

Published

2020

44. The fundamental group of a log terminal $$\mathbb {T}$$ T -variety

Author

Alvaro Liendo, Antonio Laface, and Joaquín Moraga

Subjects

Fundamental group, General Mathematics, 010102 general mathematics, Spectrum (functional analysis), Fano variety, Torus, Algebraic geometry, 01 natural sciences, Combinatorics, Singularity, 0103 physical sciences, 010307 mathematical physics, 0101 mathematics, Variety (universal algebra), Cox ring, Mathematics

Abstract

We introduce an approach to study the fundamental group of a log terminal $$\mathbb {T}$$ -variety. As applications, we prove the simply connectedness of the spectrum of the Cox ring of a complex Fano variety, we compute the fundamental group of a rational log terminal $$\mathbb {T}$$ -variety of complexity one, and we study the local fundamental group of a log terminal $$\mathbb {T}$$ -singularity with a good torus action and trivial GIT decomposition.

Published

2018

45. Cox rings and algebraic maps

Author

Tomasz Mańdziuk

Subjects

Discrete mathematics, Pure mathematics, Class (set theory), Inverse image, General Mathematics, Image (category theory), 010102 general mathematics, Graded ring, Space (mathematics), 01 natural sciences, 010101 applied mathematics, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Morphism, 14A10, 14C20, 14L30, FOS: Mathematics, 0101 mathematics, Algebraic number, Algebraic Geometry (math.AG), Cox ring, Mathematics

Abstract

Given a morphism $F : X \rightarrow Y$ from a Mori Dream Space $X$ to a smooth Mori Dream Space $Y$ and quasicoherent sheaves $\mathcal{F}$ on $X$ and $\mathcal{G}$ on $Y$ , we describe the inverse image of $\mathcal{G}$ by $F$ and the direct image of $\mathcal{F}$ by $F$ in terms of the corresponding modules over the Cox rings graded in the class groups., Comment: Final version published in Mathematische Nachrichten

Published

2018

46. The algebra of conformal blocks

Author

Christopher Manon

Subjects

Pure mathematics, Direct sum, Applied Mathematics, General Mathematics, 010102 general mathematics, Vector bundle, Algebraic variety, 01 natural sciences, Moduli, Mathematics::Algebraic Geometry, 0103 physical sciences, Simply connected space, Sheaf, 010307 mathematical physics, 0101 mathematics, Mathematics::Symplectic Geometry, Cox ring, Mathematics, Stack (mathematics)

Abstract

For each simply connected, simple complex group $G$ we show that the direct sum of all vector bundles of conformal blocks on the moduli stack $\bar{\mathcal{M}}_{g, n}$ of stable marked curves carries the structure of a flat sheaf of commutative algebras. The fiber of this sheaf over a smooth marked curve $(C, \vec{p})$ agrees with the Cox ring of the moduli of quasi-parabolic principal $G-$bundles on $(C, \vec{p})$. We use the factorization rules on conformal blocks to produce flat degenerations of these algebras. These degenerations are toric in the case $G = SL_2(\mathbb{C}),$ and the resulting toric varieties are shown to be isomorphic to phylogenetic algebraic varieties from mathematical biology. We conclude with a proof that the Cox ring of the moduli stack of qausi-parabolic $SL_2(\mathbb{C})$ principal bundles over a generic curve is generated by conformal blocks of levels 1 and 2 with relations generated in degrees $2, 3,$ and 4.

Published

2018

47. Demazure Construction for ℤn-Graded Krull Domains

Author

Kazuhiko Kurano, Ayaka Echizenya, and Yusuke Arai

Subjects

Combinatorics, Physics, Ring (mathematics), Mathematics::Commutative Algebra, Degree (graph theory), General Mathematics, Domain (ring theory), Krull ring, Field (mathematics), Algebraically closed field, Cox ring, Projective variety

Abstract

For a Mori dream space X, the Cox ring Cox(X) is a Noetherian $\mathbb {Z}^{n}$ -graded normal domain for some n > 0. Let C(Cox(X)) be the cone (in $\mathbb {R}^{n}$ ) which is spanned by the vectors $\boldsymbol {a} \in \mathbb {Z}^{n}$ such that Cox(X)a≠ 0. Then, C(Cox(X)) is decomposed into a union of chambers. Berchtold and Hausen (Michigan Math. J., 54(3) 483–515: 2006) proved the existence of such decompositions for affine integral domains over an algebraically closed field. We shall give an elementary algebraic proof to this result in the case where the homogeneous component of degree 0 is a field. Using such decompositions, we develop the Demazure construction for $\mathbb {Z}^{n}$ -graded Krull domains. That is, under an assumption, we show that a $\mathbb {Z}^{n}$ -graded Krull domain is isomorphic to the multi-section ring R(X;D1,…, Dn) for certain normal projective variety X and $\mathbb {Q}$ -divisors D1, …, Dn on X.

Published

2018

48. ON SMOOTHNESS OF MINIMAL MODELS OF QUOTIENT SINGULARITIES BY FINITE SUBGROUPS OF SLn(ℂ)

Author

Ryo Yamagishi

Subjects

Pure mathematics, General Mathematics, 010102 general mathematics, Minimal models, 01 natural sciences, Minimal model, Singularity, 0103 physical sciences, Crepant resolution, Gravitational singularity, 010307 mathematical physics, 0101 mathematics, Cox ring, Quotient, Symplectic geometry, Mathematics

Abstract

We prove that a quotient singularity ℂn/G by a finite subgroup G ⊂ SLn(ℂ) has a crepant resolution only if G is generated by junior elements. This is a generalization of the result of Verbitsky (Asian J. Math.4(3) (2000), 553–563). We also give a procedure to compute the Cox ring of a minimal model of a given ℂn/G explicitly from information of G. As an application, we investigate the smoothness of minimal models of some quotient singularities. Together with work of Bellamy and Schedler, this completes the classification of symplectically imprimitive quotient singularities that admit projective symplectic resolutions.

Published

2018

49. On orbits of the automorphism group on an affine toric variety.

Author

Arzhantsev, Ivan and Bazhov, Ivan

Abstract

Let X be an affine toric variety. The total coordinates on X provide a canonical presentation $$\bar X \to X$$ of X as a quotient of a vector space $$\bar X$$ by a linear action of a quasitorus. We prove that the orbits of the connected component of the automorphism group Aut( X) on X coincide with the Luna strata defined by the canonical quotient presentation. [ABSTRACT FROM AUTHOR]

Published

2013

50. Factorial algebraic group actions and categorical quotients.

Author

Arzhantsev, Ivan V., Celik, Devrim, and Hausen, Jürgen

Subjects

*FACTOR analysis, *GROUP theory, *CATEGORIES (Mathematics), *AFFINE algebraic groups, *VARIETIES (Universal algebra), *SET theory

Abstract

Abstract: Given an action of an affine algebraic group with only trivial characters on a factorial variety, we ask for categorical quotients. We characterize existence in the category of algebraic varieties. Moreover, allowing constructible sets as quotients, we obtain a more general existence result, which, for example, settles the case of a finitely generated algebra of invariants. As an application, we provide a combinatorial GIT-type construction of categorical quotients for actions of not necessarily reductive groups on, e.g. complete varieties with finitely generated Cox ring via lifting to the characteristic space. [Copyright &y& Elsevier]

Published

2013