Your search keyword '"HODGE theory"' showing total 84 results

1. A geometric p -adic Simpson correspondence in rank one.

Author

Heuer, Ben

Subjects

*HODGE theory, *PROJECTIVE spaces, *TOPOLOGICAL groups, *CHERN classes, *ANALYTIC spaces, *VECTOR bundles

Abstract

For any smooth proper rigid space $X$ over a complete algebraically closed extension $K$ of $\mathbb {Q}_p$ we give a geometrisation of the $p$ -adic Simpson correspondence of rank one in terms of analytic moduli spaces: the $p$ -adic character variety is canonically an étale twist of the moduli space of topologically torsion Higgs line bundles over the Hitchin base. This also eliminates the choice of an exponential. The key idea is to relate both sides to moduli spaces of $v$ -line bundles. As an application, we study a major open question in $p$ -adic non-abelian Hodge theory raised by Faltings, namely which Higgs bundles correspond to continuous representations under the $p$ -adic Simpson correspondence. We answer this question in rank one by describing the essential image of the continuous characters $\pi ^{{\mathrm {\acute {e}t}}}_1(X)\to K^\times$ in terms of moduli spaces: for projective $X$ over $K=\mathbb {C}_p$ , it is given by Higgs line bundles with vanishing Chern classes like in complex geometry. However, in general, the correct condition is the strictly stronger assumption that the underlying line bundle is a topologically torsion element in the topological group $\operatorname {Pic}(X)$. [ABSTRACT FROM AUTHOR]

Published

2024

2. G -valued crystalline deformation rings in the Fontaine–Laffaille range.

Author

Booher, Jeremy and Levin, Brandon

Subjects

*RINGS of integers, *GROUP extensions (Mathematics), *GROUP rings, *HODGE theory

Abstract

Let $G$ be a split reductive group over the ring of integers in a $p$ -adic field with residue field $\mathbf {F}$. Fix a representation $\overline {\rho }$ of the absolute Galois group of an unramified extension of $\mathbf {Q}_p$ , valued in $G(\mathbf {F})$. We study the crystalline deformation ring for $\overline {\rho }$ with a fixed $p$ -adic Hodge type that satisfies an analog of the Fontaine–Laffaille condition for $G$ -valued representations. In particular, we give a root theoretic condition on the $p$ -adic Hodge type which ensures that the crystalline deformation ring is formally smooth. Our result improves on all known results for classical groups not of type A and provides the first such results for exceptional groups. [ABSTRACT FROM AUTHOR]

Published

2023

3. p -adic Eichler–Shimura maps for the modular curve.

Author

Rodríguez Camargo, Juan Esteban

Subjects

*HODGE theory, *CURVES

Abstract

We give a new proof of Faltings's $p$ -adic Eichler–Shimura decomposition of the modular curves via Bernstein–Gelfand–Gelfand (BGG) methods and the Hodge–Tate period map. The key property is the relation between the Tate module and the Faltings extension, which was used in the original proof. Then we construct overconvergent Eichler–Shimura maps for the modular curves providing 'the second half' of the overconvergent Eichler–Shimura map of Andreatta, Iovita and Stevens. We use higher Coleman theory on the modular curve developed by Boxer and Pilloni to show that the small-slope part of the Eichler–Shimura maps interpolates the classical $p$ -adic Eichler–Shimura decompositions. Finally, we prove that overconvergent Eichler–Shimura maps are compatible with Poincaré and Serre pairings. [ABSTRACT FROM AUTHOR]

Published

2023

4. A $p$ -adic monodromy theorem for de Rham local systems.

Author

Shimizu, Koji

Subjects

*MONODROMY groups, *HODGE theory, *ANALYTIC geometry

Abstract

We study horizontal semistable and horizontal de Rham representations of the absolute Galois group of a certain smooth affinoid over a $p$ -adic field. In particular, we prove that a horizontal de Rham representation becomes horizontal semistable after a finite extension of the base field. As an application, we show that every de Rham local system on a smooth rigid analytic variety becomes horizontal semistable étale locally around every classical point. We also discuss potentially crystalline loci of de Rham local systems and cohomologically potentially good reduction loci of smooth proper morphisms. [ABSTRACT FROM AUTHOR]

Published

2022

5. Absolute Hodge and ℓ-adic monodromy.

Author

Urbanik, David

Subjects

*MONODROMY groups, *HODGE theory, *LOGICAL prediction

Abstract

Let $\mathbb {V}$ be a motivic variation of Hodge structure on a $K$ -variety $S$ , let $\mathcal {H}$ be the associated $K$ -algebraic Hodge bundle, and let $\sigma \in \mathrm {Aut}(\mathbb {C}/K)$ be an automorphism. The absolute Hodge conjecture predicts that given a Hodge vector $v \in \mathcal {H}_{\mathbb {C}, s}$ above $s \in S(\mathbb {C})$ which lies inside $\mathbb {V}_{s}$ , the conjugate vector $v_{\sigma } \in \mathcal {H}_{\mathbb {C}, s_{\sigma }}$ is Hodge and lies inside $\mathbb {V}_{s_{\sigma }}$. We study this problem in the situation where we have an algebraic subvariety $Z \subset S_{\mathbb {C}}$ containing $s$ whose algebraic monodromy group $\textbf {H}_{Z}$ fixes $v$. Using relationships between $\textbf {H}_{Z}$ and $\textbf {H}_{Z_{\sigma }}$ coming from the theories of complex and $\ell$ -adic local systems, we establish a criterion that implies the absolute Hodge conjecture for $v$ subject to a group-theoretic condition on $\textbf {H}_{Z}$. We then use our criterion to establish new cases of the absolute Hodge conjecture. [ABSTRACT FROM AUTHOR]

Published

2022

6. Rigid-analytic varieties with projective reduction violating Hodge symmetry.

Author

Petrov, Alexander

Subjects

*SYMMETRY, *HODGE theory

Abstract

We construct examples of smooth proper rigid-analytic varieties admitting formal models with projective special fibers and violating Hodge symmetry for cohomology in degrees ${\geq }3$. This answers negatively the question raised by Hansen and Li. [ABSTRACT FROM AUTHOR]

Published

2021

7. Hodge Representations

Author

Xiayimei Han, Colleen Robles, and Adrian Clingher

Subjects

58A14, Hodge theory, Technology, Medicine, Science

Abstract

Green–Griffiths–Kerr introduced Hodge representations to classify the Hodge groups of polarized Hodge structures, and the corresponding Mumford–Tate subdomains. We summarize how, given a fixed period domain $ \mathcal{D} $ , to enumerate the Hodge representations and corresponding Mumford–Tate subdomains $ D \subset \mathcal{D} $ . The procedure is illustrated in two examples: (i) weight two Hodge structures with $ {p}_g={h}^{2,0}=2 $ ; and (ii) weight three CY-type Hodge structures.

Published

2020

8. Nonabelian Hodge theory for klt spaces and descent theorems for vector bundles.

Author

Greb, Daniel, Kebekus, Stefan, Peternell, Thomas, and Taji, Behrouz

Subjects

*HODGE theory, *VECTOR bundles, *SPACE

Abstract

We generalise Simpson's nonabelian Hodge correspondence to the context of projective varieties with Kawamata log terminal (klt) singularities. The proof relies on a descent theorem for numerically flat vector bundles along birational morphisms. In its simplest form, this theorem asserts that given any klt variety X and any resolution of singularities, any vector bundle on the resolution that appears to come from X numerically, does indeed come from X. Furthermore, and of independent interest, a new restriction theorem for semistable Higgs sheaves defined on the smooth locus of a normal, projective variety is established. [ABSTRACT FROM AUTHOR]

Published

2019

9. ALEXANDER POLYNOMIALS OF COMPLEX PROJECTIVE PLANE CURVES.

Author

LÊ, QUY THUONG

Subjects

*POLYNOMIALS, *PLANE curves, *HODGE theory, *EIGENVALUE equations, *HOMOMORPHISMS, *MATHEMATICS theorems

Abstract

We compute the Alexander polynomial of a nonreduced nonirreducible complex projective plane curve with mutually coprime orders of vanishing along its irreducible components in terms of certain multiplier ideals. [ABSTRACT FROM AUTHOR]

Published

2018

10. The geometry of Hida families II: ∧-adic (φ,Γ)-modules and ∧-adic Hodge theory.

Author

Cais, Bryden

Subjects

*CRYSTAL texture, *INTEGRAL equations, *HODGE theory, *ISOMORPHISM (Mathematics), *COHOMOLOGY theory

Abstract

We construct the ∧-adic crystalline and Dieudonné analogues of Hida’s ordinary ∧-adic étale cohomology, and employ integral p-adic Hodge theory to prove ∧-adic comparison isomorphisms between these cohomologies and the ∧-adic de Rham cohomology studied in Cais [The geometry of Hida families I: ∧-adic de Rham cohomology, Math. Ann. (2017), doi: 10.1007/s00208-017-1608-1 ] as well as Hida’s $∧-adic étale cohomology. As applications of our work, we provide a ‘cohomological’ construction of the family of (φ,Γ)-modules attached to Hida’s ordinary ∧-adic étale cohomology by Dee [ Φ – Γ modules for families of Galois representations, J. Algebra 235 (2001), 636–664], and we give a new and purely geometric proof of Hida’s finiteness and control theorems. We also prove suitable ∧-adic duality theorems for each of the cohomologies we construct. [ABSTRACT FROM AUTHOR]

Published

2018

11. p-ADIC HODGE THEORY FOR RIGID-ANALYTIC VARIETIES - CORRIGENDUM.

Subjects

*P-adic analysis, *HODGE theory

Abstract

Corrections to the article "p-Adic Hodge Theory for Rigid-Analytic Varieties" that was published in the 17 May 2013 issue are presented.

Published

2016

12. Perverse, Hodge and motivic realizations of étale motives.

Author

Ivorra, Florian

Subjects

*MATHEMATICS, *HODGE theory, *ALGEBRA, *TRIANGULATION, *ABELIAN categories

Abstract

Let $k=\mathbb{C}$ be the field of complex numbers. In this article we construct Hodge realization functors defined on the triangulated categories of étale motives with rational coefficients. Our construction extends to every smooth quasi-projective $k$-scheme, the construction done by Nori over a field, and relies on the original version of the basic lemma proved by Beĭlinson. As in the case considered by Nori, the realization functor factors through the bounded derived category of a perverse version of the Abelian category of Nori motives. [ABSTRACT FROM AUTHOR]

Published

2016

13. $K({\it\pi},1)$-neighborhoods and comparison theorems.

Author

Achinger, Piotr

Subjects

*P-adic logarithms, *HODGE theory, *MATHEMATICAL proofs, *NOETHER'S theorem, *MULTIPLE comparisons (Statistics), *MATHEMATICAL research

Abstract

A technical ingredient in Faltings’ original approach to $p$-adic comparison theorems involves the construction of $K({\it\pi},1)$-neighborhoods for a smooth scheme $X$ over a mixed characteristic discrete valuation ring with a perfect residue field: every point $x\in X$ has an open neighborhood $U$ whose generic fiber is a $K({\it\pi},1)$ scheme (a notion analogous to having a contractible universal cover). We show how to extend this result to the logarithmically smooth case, which might help to simplify some proofs in $p$-adic Hodge theory. The main ingredient of the proof is a variant of a trick of Nagata used in his proof of the Noether normalization lemma. [ABSTRACT FROM PUBLISHER]

Published

2015

14. THE WEIGHT PART OF SERRE'S CONJECTURE FOR GL(2).

Author

GEE, TOBY, TONG LIU, and SAVITT, DAVID

Subjects

*FINITE fields, *LOGICAL prediction, *FORMALLY real fields, *PRIME numbers, *HILBERT modular surfaces, *HODGE theory

Abstract

Let p > 2 be prime. We use purely local methods to determine the possible reductions of certain two-dimensional crystalline representations, which we call pseudo-Barsotti-Tate representations, over arbitrary finite extensions of ℚp. As a consequence, we establish (under the usual Taylor–Wiles hypothesis) the weight part of Serre's conjecture for GL.2/ over arbitrary totally real fields. [ABSTRACT FROM AUTHOR]

Published

2015

15. Suggestions for Further Reading

Author

Greg Friedman

Subjects

Algebra, Reading (process), media_common.quotation_subject, Hodge theory, L² cohomology, Characteristic class, media_common, Mathematics

Published

2020

16. Hodge Theory and Complex Algebraic Geometry II: Volume 2

Author

Claire Voisin and Claire Voisin

Subjects

Hodge theory, Geometry, Algebraic

Abstract

The 2003 second volume of this account of Kaehlerian geometry and Hodge theory starts with the topology of families of algebraic varieties. Proofs of the Lefschetz theorem on hyperplane sections, the Picard–Lefschetz study of Lefschetz pencils, and Deligne theorems on the degeneration of the Leray spectral sequence and the global invariant cycles follow. The main results of the second part are the generalized Noether–Lefschetz theorems, the generic triviality of the Abel–Jacobi maps, and most importantly Nori's connectivity theorem, which generalizes the above. The last part of the book is devoted to the relationships between Hodge theory and algebraic cycles. The book concludes with the example of cycles on abelian varieties, where some results of Bloch and Beauville, for example, are expounded. The text is complemented by exercises giving useful results in complex algebraic geometry. It will be welcomed by researchers in both algebraic and differential geometry.

Published

2003

17. Hodge Theory and Complex Algebraic Geometry I: Volume 1

Author

Claire Voisin and Claire Voisin

Subjects

Hodge theory, Geometry, Algebraic

Abstract

The first of two volumes offering a modern introduction to Kaehlerian geometry and Hodge structure. The book starts with basic material on complex variables, complex manifolds, holomorphic vector bundles, sheaves and cohomology theory, the latter being treated in a more theoretical way than is usual in geometry. The author then proves the Kaehler identities, which leads to the hard Lefschetz theorem and the Hodge index theorem. The book culminates with the Hodge decomposition theorem. The meanings of these results are investigated in several directions. Completely self-contained, the book is ideal for students, while its content gives an account of Hodge theory and complex algebraic geometry as has been developed by P. Griffiths and his school, by P. Deligne, and by S. Bloch. The text is complemented by exercises which provide useful results in complex algebraic geometry.

Published

2002

18. On the algebraicity of the zero locus of an admissible normal function.

Author

Brosnan, Patrick and Pearlstein, Gregory

Subjects

*ZERO (The number), *MATHEMATICAL functions, *SMOOTHING (Numerical analysis), *ALGEBRAIC varieties, *GROUP theory, *CATEGORIES (Mathematics), *LIMIT theorems

Abstract

We show that the zero locus of an admissible normal function on a smooth complex algebraic variety is algebraic. In Part II of the paper, which is an appendix, we compute the Tannakian Galois group of the category of one-variable admissible real nilpotent orbits with split limit. We then use the answer to recover an unpublished theorem of Deligne, which characterizes the ${\mathrm{sl} }_{2} $-splitting of a real mixed Hodge structure. [ABSTRACT FROM AUTHOR]

Published

2013

19. The Hodge ring of Kähler manifolds.

Author

Kotschick, D. and Schreieder, S.

Subjects

*HODGE theory, *MANIFOLDS (Mathematics), *INVARIANTS (Mathematics), *MATHEMATICAL combinations, *MATHEMATICAL complexes, *RING theory, *TOPOLOGICAL property

Abstract

We determine the structure of the Hodge ring, a natural object encoding the Hodge numbers of all compact Kähler manifolds. As a consequence of this structure, there are no unexpected relations among the Hodge numbers, and no essential differences between the Hodge numbers of smooth complex projective varieties and those of arbitrary Kähler manifolds. The consideration of certain natural ideals in the Hodge ring allows us to determine exactly which linear combinations of Hodge numbers are birationally invariant, and which are topological invariants. Combining the Hodge and unitary bordism rings, we are also able to treat linear combinations of Hodge and Chern numbers. In particular, this leads to a complete solution of a classical problem of Hirzebruch’s. [ABSTRACT FROM AUTHOR]

Published

2013

20. On admissible tensor products in p-adic Hodge theory.

Author

Di Matteo, Giovanni

Subjects

*TENSOR products, *HODGE theory, *REPRESENTATION theory, *SCHUR functions, *CALCULUS of tensors, *LINEAR algebra

Abstract

We prove that if W and W′ are non-zero B-pairs whose tensor product is crystalline (or semi-stable or de Rham or Hodge–Tate), then there exists a character μ such that W(μ−1) and W′(μ) are crystalline (or semi-stable or de Rham or Hodge–Tate). We also prove that if W is a B-pair and if F is a Schur functor (for example Sym n or Λn) such that F(W) is crystalline (or semi-stable or de Rham or Hodge–Tate) and if the rank of W is sufficiently large, then there is a character μ such that W(μ−1) is crystalline (or semi-stable or de Rham or Hodge–Tate). In particular, these results apply to p-adic representations. [ABSTRACT FROM AUTHOR]

Published

2013

21. Cohomological Hall algebra of a symmetric quiver.

Author

Efimov, Alexander I.

Subjects

*HOMOLOGY theory, *MATHEMATICAL symmetry, *DONALDSON-Thomas invariants, *HODGE theory, *COMMUTATIVE algebra, *GENERATING functions

Abstract

In [M. Kontsevich and Y. Soibelman, Cohomological Hall algebra, exponential Hodge structures and motivic Donaldson–Thomas invariants, Preprint (2011), arXiv:1006.2706v2[math.AG]], the authors, in particular, associate to each finite quiver Q with a set of vertices I the so-called cohomological Hall algebra ℋ, which is ℤI≥0-graded. Its graded component ℋγ is defined as cohomology of the Artin moduli stack of representations with dimension vector γ. The product comes from natural correspondences which parameterize extensions of representations. In the case of a symmetric quiver, one can refine the grading to ℤI≥0×ℤ, and modify the product by a sign to get a super-commutative algebra (ℋ,⋆) (with parity induced by the ℤ-grading). It is conjectured in [M. Kontsevich and Y. Soibelman, Cohomological Hall algebra, exponential Hodge structures and motivic Donaldson–Thomas invariants, Preprint (2011), arXiv:1006.2706v2[math.AG]] that in this case the algebra (ℋ⊗ℚ,⋆) is free super-commutative generated by a ℤI≥0×ℤ-graded vector space of the form V =Vprim ⊗ℚ[x] , where x is a variable of bidegree (0,2)∈ℤI≥0×ℤ, and all the spaces ⨁ k∈ℤVprimγ,k, γ∈ℤI≥0. are finite-dimensional. In this paper we prove this conjecture (Theorem 1.1). We also prove some explicit bounds on pairs (γ,k) for which Vprimγ,k≠0 (Theorem 1.2). Passing to generating functions, we obtain the positivity result for quantum Donaldson–Thomas invariants, which was used by Mozgovoy to prove Kac’s conjecture for quivers with sufficiently many loops [S. Mozgovoy, Motivic Donaldson–Thomas invariants and Kac conjecture, Preprint (2011), arXiv:1103.2100v2[math.AG]]. Finally, we mention a connection with the paper of Reineke [M. Reineke, Degenerate cohomological Hall algebra and quantized Donaldson–Thomas invariants for m-loop quivers, Preprint (2011), arXiv:1102.3978v1[math.RT]]. [ABSTRACT FROM AUTHOR]

Published

2012

22. Tropical geometry and the motivic nearby fiber.

Author

Katz, Eric and Stapledon, Alan

Subjects

*TROPICAL geometry, *FIBER bundles (Mathematics), *MONODROMY groups, *HODGE theory, *ALGEBRAIC geometry, *TORUS, *EULER characteristic

Abstract

We construct motivic invariants of a subvariety of an algebraic torus from its tropicalization and initial degenerations. More specifically, we introduce an invariant of a compactification of such a variety called the ‘tropical motivic nearby fiber’. This invariant specializes in the schön case to the Hodge–Deligne polynomial of the limit mixed Hodge structure of a corresponding degeneration. We give purely combinatorial expressions for this Hodge–Deligne polynomial in the cases of schön hypersurfaces and matroidal tropical varieties. We also deduce a formula for the Euler characteristic of a general fiber of the degeneration. [ABSTRACT FROM PUBLISHER]

Published

2012

23. Characteristic varieties and logarithmic differential 1-forms.

Author

Dimca, Alexandru

Subjects

*HOMOLOGY theory, *LOGARITHMIC functions, *ELLIPTIC curves, *ALGEBRA, *ISOMORPHISM (Mathematics)

Abstract

We introduce in this paper a hypercohomology version of the resonance varieties and obtain some relations to the characteristic varieties of rank one local systems on a smooth quasi-projective complex variety M. A logarithmic resonance variety is also considered and, as an application, we determine the first characteristic variety of the configuration space of n distinct labeled points on an elliptic curve. Finally, for a logarithmic 1-form α on M we investigate the relation between the resonance degree of α and the codimension of the zero set of α on a good compactification of M. This question was inspired by the recent work by Cohen, Denham, Falk and Varchenko. [ABSTRACT FROM AUTHOR]

Published

2010

24. NON-GENERICITY OF INFINITESIMAL VARIATIONS OF HODGE STRUCTURES ARISING IN SOME GEOMETRIC CONTEXTS.

Author

Allaud, Emmanuel and Fernandez, Javier

Subjects

INFINITESIMAL geometry, GEOMETRIC analysis, CALCULUS of variations, HODGE theory, COMBINATORIAL geometry, HYPERSURFACES

Abstract

We prove that the infinitesimal variations of Hodge structure arising in a number of geometric situations are non-generic. In particular, we consider the case of generic hypersurfaces in complete smooth projective toric varieties, generic hypersurfaces in weighted projective spaces and generic complete intersections in projective space and show that, for sufficiently high degrees, the corresponding infinitesimal variations are non-generic. [ABSTRACT FROM AUTHOR]

Published

2010

25. PRESQUE Cp-REPRÉSENTATIONS ET (φ, Γ)-MODULES.

Author

Berger, Laurent

Subjects

MODULES (Algebra), REPRESENTATIONS of algebras, HODGE theory, P-adic analysis, FROBENIUS algebras

Abstract

Copyright of Journal of the Institute of Mathematics of Jussieu is the property of Cambridge University Press and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published

2009

26. Hilbert modular forms and p-adic Hodge theory.

Author

Takeshi Saito

Subjects

*HODGE theory, *HILBERT modular surfaces, *GALOIS modules (Algebra), *GROUP theory, *MONODROMY groups, *MATHEMATICAL proofs

Abstract

AbstractFor the p-adic Galois representation associated to a Hilbert modular form, Carayol has shown that, under a certain assumption, its restriction to the local Galois group at a finite place not dividing pis compatible with the local Langlands correspondence. Under the same assumption, we show that the same is true for the places dividing p, in the sense of p-adic Hodge theory, as is shown for an elliptic modular form. We also prove that the monodromy-weight conjecture holds for such representations. [ABSTRACT FROM AUTHOR]

Published

2009

27. Schematic homotopy types and non-abelian Hodge theory.

Author

L. Katzarkov, T. Pantev, and B. To?n

Subjects

*HOMOTOPY theory, *HODGE theory, *MATHEMATICAL decomposition, *PROJECTIVE modules (Algebra), *MANIFOLDS (Mathematics), *THEORY

Abstract

AbstractWe use Hodge theoretic methods to study homotopy types of complex projective manifolds with arbitrary fundamental groups. The main tool we use is the schematization functor$X \mapsto (X\otimes \mathbb {C})^{\mathrm {sch}}$, introduced by the third author as a substitute for the rationalization functor in homotopy theory in the case of non-simply connected spaces. Our main result is the construction of a Hodge decompositionon $(X\otimes \mathbb {C})^{\mathrm {sch}}$. This Hodge decomposition is encoded in an action of the discrete group $\mathbb {C}^{\times \delta }$on the object $(X\otimes \mathbb {C})^{\mathrm {sch}}$and is shown to recover the usual Hodge decomposition on cohomology, the Hodge filtration on the pro-algebraic fundamental group, and, in the simply connected case, the Hodge decomposition on the complexified homotopy groups. We show that our Hodge decomposition satisfies a purity property with respect to a weight filtration, generalizing the fact that the higher homotopy groups of a simply connected projective manifold have natural mixed Hodge structures. As applications we construct new examples of homotopy types which are not realizable as complex projective manifolds and we prove a formality theorem for the schematization of a complex projective manifold. [ABSTRACT FROM AUTHOR]

Published

2008

28. On lattices in semi-stable representations: a proof of a conjecture of Breuil.

Author

Tong Liu

Subjects

*RINGS of integers, *LATTICE theory, *GALOIS theory, *HODGE theory, *COMPLEX manifolds

Abstract

AbstractFor p?3 an odd prime and a nonnegative integer r?p?2, we prove a conjecture of Breuil on lattices in semi-stable representations, that is, the anti-equivalence of categories between the category of strongly divisible lattices of weight rand the category of Galois stable $\mathbb {Z}_p$-lattices in semi-stable p-adic Galois representations with Hodge?Tate weights in {0,?,r}. [ABSTRACT FROM AUTHOR]

Published

2008

29. Applications to Algebraic Cycles: Nori's Theorem

Author

James A. Carlson, Chris Peters, and Stefan Müller-Stach

Subjects

Section (fiber bundle), Algebraic cycle, Discrete mathematics, Deligne cohomology, Pure mathematics, Mathematics::Algebraic Geometry, Intermediate Jacobian, Mathematics::K-Theory and Homology, Group (mathematics), Hodge theory, Sheaf, Cohomology, Mathematics

Abstract

Deligne cohomology is a tool that makes it possible to unify the study of cycles through an object that classifies extensions of ( p , p )-cycles by points in the p -th intermediate Jacobian (which is the target of the Abel–Jacobi map on cycles of codimension p ). This is treated in Section 10.1 with applications to normal functions. Before giving the proof of Nori's theorem in Section 10.6, we need some results from mixed Hodge theory. These are proven in Section 10.2 where we also state different variants of the theorem. Sections 10.3 and 10.4 treat a localto- global principle and an extension of the method of Jacobian representations of cohomology which are both essential for the proof. We finish the chapter with some applications of Nori's theorem and discuss the conjectured filtrations on the Chow groups to which these lead. A Detour into Deligne Cohomology with Applications Here we introduce Deligne cohomology in the form first defined by P. Deligne. We illustrate its connections to intermediate Jacobians and explain its functorial properties. Then we give the second proof of Theorem 9.1.3. The results of this section are not needed for an understanding of the rest of the chapter, and some readers may want to skip this section and read it later. In the historical remarks at the end of the chapter we point out some further directions where Deligne–Beilinson cohomology becomes more important. Deligne cohomology was defined first by P. Deligne and later extended by A. Beilinson. We use here mainly the original version of Deligne without growth conditions for noncompact spaces. Beilinson later imposed such growth conditions in order to get a more functorial theory. The extension of Beilinson has been worked out in detail in Esnault and Viehweg (1988). Definition 10.1.1 Let X be a Kahler manifold. Define the analytic Deligne complex on X by This is a complex of sheaves in the analytic topology and we put the first sheaf (2πi) p Z , which is a constant subsheaf of C , in degree 0. Hence the last sheaf, sits in degree p . We denote by the 2 p -th hypercohomology of this complex and call it the Deligne cohomology group of X .

Published

2017

30. Hodge Structures and Algebraic Groups

Author

Chris Peters, James A. Carlson, and Stefan Müller-Stach

Subjects

Algebraic cycle, Hodge conjecture, Pure mathematics, p-adic Hodge theory, Hodge theory, Algebraic surface, Complex differential form, Group theory, Algebraic geometry and analytic geometry, Mathematics

Published

2017

31. Harmonic Maps and Hodge Theory

Author

Chris Peters, Stefan Müller-Stach, and James A. Carlson

Subjects

Hodge theory, Mathematical analysis, Harmonic map, Mathematics

Published

2017

32. Period Maps and Period Domains

Author

Müller-Stach, Stefan, Carlson, James, and Discrete Mathematics

Subjects

Period domains, Hodge theory, Harmonic maps, Mumford-Tate domains

Published

2017

33. Period Maps and Period Domains

Subjects

Period domains, Hodge theory, Harmonic maps, Mumford-Tate domains

Published

2017

34. Studies of closed/open mirror symmetry for quintic threefolds through log mixed Hodge theory

Author

Sampei Usui

Subjects

Hodge theory, Mirror symmetry, Mathematical physics, Quintic function, Mathematics

Published

2016

35. Geometric Hodge structures with prescribed Hodge numbers

Author

Donu Arapura

Subjects

Pure mathematics, Hodge theory, Algebra over a field, Geometry and topology, Mathematics

Published

2016

36. Arithmetic and Geometry

Author

D. R. Heath-Brown, Gerd Faltings, Jean-Pierre Wintenberger, Luis V. Dieulefait, I︠u︡. I. Manin, and Boris Z. Moroz

Subjects

Pure mathematics, Diophantine geometry, Hodge theory, Modular form, Galois group, Iwasawa theory, Algebraic number field, Abelian group, Arithmetic, Galois module, Mathematics

Abstract

Preface Luis Dieulefait, Gerd Faltings, D. R. Heath-Brown, Yuri I. Manin, B. Z. Moroz and Jean-Pierre Wintenberger Introduction List of participants Trimester seminar Workshop on the Serre conjecture The research conference 1. Galois groups of local fields, Lie algebras, and ramification Victor Abrashkin 2. A characterisation of ordinary modular eigenforms with CM Rajender Adibhatla and Panagiotis Tsaknias 3. Selmer complexes and p-adic Hodge theory Denis Benois 4. A survey of applications of the circle method to rational points T. D. Browning 5. Arithmetic differential equations of Painleve VI type Alexandru Buium and Yuri I. Manin 6. Differential calculus with integers Alexandru Buium 7. Un calcul de groupe de Brauer et une application arithmetique Jean-Louis Colliot-Thelene 8. Connectedness of Hecke algebras and the Rayuela conjecture: a path to functoriality and modularity Luis Dieulefait and Ariel Pacetti 9. Big image of Galois representations and congruence ideals Haruzo Hida and Jacques Tilouine 10. The skew-symmetric pairing on the Lubin-Tate formal module M. A. Ivanov and S. V. Vostokov 11. Equations in matrix groups and algebras over number fields and rings: prolegomena to a lowbrow noncommutative Diophantine geometry Boris Kunyavskii 12. On the l-adic regulator as an ingredient of Iwasawa theory L. V. Kuz'min 13. On a counting problem for G-shtukas Ngo Dac Tuan 14. Modular forms and Calabi-Yau varieties Kapil Paranjape and Dinakar Ramakrishnan 15. Derivative of symmetric square p-adic L-functions via pull-back formula Giovanni Rosso 16. Uniform bounds for rational points on cubic hypersurfaces Per Salberger 17. Descent on toric fibrations Alexei N. Skorobogatov 18. On filtrations of vector bundles over P1Z A. Smirnov 19. On the dihedral Euler characteristics of Selmer groups of Abelian varieties Jeanine Van Order 20. CM values of higher Green's functions and regularized Petersson products Maryna Viazovska.

Published

2015

37. The Hodge ⋆ Operator

Author

Thomas A. Garrity

Subjects

Algebra, Operator (physics), Hodge theory, Mathematics

Published

2015

38. Flag manifolds. Variations of Hodge structures

Author

Sergio Cecotti

Subjects

Combinatorics, Hodge theory, Mathematics, Flag (geometry)

Published

2014

39. Mathematical Appendix: Manifolds, Differential Forms, Cohomology, Riemannian Structures

Author

P. Robert Kotiuga and Paul W. Gross

Subjects

Pure mathematics, symbols.namesake, Curvature of Riemannian manifolds, Global analysis, Ricci-flat manifold, Hodge theory, Mathematical analysis, symbols, De Rham cohomology, Equivariant cohomology, Differential topology, Riemannian geometry, Mathematics

Published

2004

40. Hodge Number Polynomials for Nearby and Vanishing Cohomology

Author

J. H. M. Steenbrink and Chris Peters

Subjects

Pure mathematics, Hodge theory, 010102 general mathematics, Complex differential form, 01 natural sciences, Positive form, Hodge conjecture, Algebra, p-adic Hodge theory, 0103 physical sciences, 010307 mathematical physics, 0101 mathematics, Hodge dual, Motivic integration, Hodge structure, Mathematics

Abstract

We recall the construction of the Hodge character and we show, us-ing a result due to F. Bittner, that these can be constructed usingclassical pure Hodge theory only, sideskipping Deligne’s constructionof functorial mixed Hodge structures on the cohomology of algberaicvarieties. We then give a proof, based on the weak factorization theo-rem, that the nearby fibre is well-defined in the Grothendieck group ofvarieties. Finally, various formulas for numerical invariants of Hodge-theoretic origin are presented which are associated to one-parameterdegenerations of projective manifolds.Keywords: Hodge structure, Hodge Euler polynomial, Hodge number polynomial,nearby and vanishing cohomologyMSC2000 classification: 14D07, 32G20 1 Introduction The behaviour of the cohomology of a degenerating family of complex pro-jective manifolds has been intensively studied in the nineteen-seventies byClemens, Griffiths, Schmid and others. See [Gr] for a nice overview. Re-cently, the theory of motivic integration, initiated by Kontsevich and de-veloped by Denef and Loeser, has given a new impetus to this topic. Inparticular, in the case of a one-parameter degeneration it has produced anobject ψ

Published

2007

41. Lefschetz Pencils

Author

Leila Schneps and Claire Voisin

Subjects

Algebraic cycle, Hodge conjecture, Pure mathematics, Function field of an algebraic variety, Hodge theory, Mathematical analysis, Algebraic surface, Real algebraic geometry, Complex differential form, Algebraic geometry and analytic geometry, Mathematics

Published

2003

42. Nori's Work

Author

Leila Schneps and Claire Voisin

Subjects

Hodge conjecture, Algebraic cycle, Pure mathematics, Function field of an algebraic variety, Hodge theory, Mathematical analysis, Algebraic surface, Complex differential form, Algebraic geometry, Algebraic geometry and analytic geometry, Mathematics

Published

2003

43. Chow Groups

Author

Claire Voisin and Leila Schneps

Subjects

Hodge conjecture, Algebraic cycle, Pure mathematics, Hodge theory, Mathematical analysis, Complex differential form, Algebraic geometry, Algebraic geometry and analytic geometry, Group theory, Mathematics, Motivic cohomology

Published

2003

44. Hodge Filtration of Hypersurfaces

Author

Leila Schneps and Claire Voisin

Subjects

Hodge conjecture, Pure mathematics, p-adic Hodge theory, Hodge theory, Mathematical analysis, Algebraic surface, Complex differential form, Algebraic geometry, Hodge dual, Geometry and topology, Mathematics

Published

2003

45. Hodge Theory and Complex Algebraic Geometry II

Author

Leila Schneps and Claire Voisin

Subjects

Algebraic cycle, Pure mathematics, Mathematics::Algebraic Geometry, Differential geometry, Hodge theory, Algebraic variety, Algebraic geometry, Algebraic number, Invariant (mathematics), Mathematics::Symplectic Geometry, Geometry and topology, Mathematics

Abstract

The 2003 second volume of this account of Kaehlerian geometry and Hodge theory starts with the topology of families of algebraic varieties. Proofs of the Lefschetz theorem on hyperplane sections, the Picard–Lefschetz study of Lefschetz pencils, and Deligne theorems on the degeneration of the Leray spectral sequence and the global invariant cycles follow. The main results of the second part are the generalized Noether–Lefschetz theorems, the generic triviality of the Abel–Jacobi maps, and most importantly Nori's connectivity theorem, which generalizes the above. The last part of the book is devoted to the relationships between Hodge theory and algebraic cycles. The book concludes with the example of cycles on abelian varieties, where some results of Bloch and Beauville, for example, are expounded. The text is complemented by exercises giving useful results in complex algebraic geometry. It will be welcomed by researchers in both algebraic and differential geometry.

Published

2003

46. Monodromy

Author

Leila Schneps and Claire Voisin

Subjects

Hodge conjecture, Pure mathematics, Function field of an algebraic variety, Monodromy, Hodge theory, Mathematical analysis, Algebraic surface, Complex differential form, Hodge structure, Algebraic geometry and analytic geometry, Mathematics

Published

2003

47. References

Author

Claire Voisin and Leila Schneps

Subjects

Algebra, Pure mathematics, Hodge theory, Foundations of geometry, Algebraic geometry, Synthetic geometry, Algebraic geometry and analytic geometry, Geometry and topology, Mathematics

Published

2003

48. Kähler Metrics

Author

Claire Voisin and Leila Schneps

Subjects

Algebraic cycle, Hodge conjecture, Pure mathematics, Function field of an algebraic variety, Hodge theory, Mathematical analysis, Algebraic surface, Real algebraic geometry, Complex differential form, Algebraic geometry and analytic geometry, Mathematics

Published

2002

49. Holomorphic de Rham Complexes and Spectral Sequences

Author

Claire Voisin and Leila Schneps

Subjects

Hodge conjecture, Algebra, Pure mathematics, Chern–Weil homomorphism, Hodge theory, Algebraic surface, Complex differential form, Hodge dual, Hodge structure, Algebraic geometry and analytic geometry, Mathematics

Published

2002

50. Hodge Structures and Polarisations

Author

Leila Schneps and Claire Voisin

Subjects

Pure mathematics, p-adic Hodge theory, Cup product, Hodge theory, Algebraic surface, Mathematical analysis, Complex differential form, Algebraic geometry, Geometry and topology, Cohomology, Mathematics

Published

2002