Search results for "Intermediate Jacobian"

showing 3 items of 3 documents

Motives of quadric bundles and relative intermediate jacobians of K3-Fano pairs

2015

This thesis consists of two parts. In the first part we study the Chow motive of a quadric bundle of odd relative dimension over a surface. We show that this motive admits a decomposition which involves the Prym motive of the double covering of the discriminant curve.In the second part, we consider Lagrangian fibrations, obtained as relative intermediate Jacobians of families of Fano threefolds containing a fixed K3 surface, and the existence of a symplectic compactification. In a particular case, we study a partial compactification using calculations with the software system Macaulay2.

Quadric bundleMotif de ChowIntermediate Jacobian[MATH.MATH-AG] Mathematics [math]/Algebraic Geometry [math.AG]Variété symplectique irréductibleLagrangian fibrationChow motiveFibration LagrangienneJacobienne intermédiaireIrreducible symplectic varietyPaire K3-FanoFibré en quadriquesK3-Fano pair
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Applications to Algebraic Cycles: Nori's Theorem

2017

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. …

Section (fiber bundle)Algebraic cycleDiscrete mathematicsDeligne cohomologyPure mathematicsMathematics::Algebraic GeometryIntermediate JacobianMathematics::K-Theory and HomologyGroup (mathematics)Hodge theorySheafCohomologyMathematics
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Abelian varieties and theta functions associated to compact Riemannian manifolds; constructions inspired by superstring theory

2012

We look into a construction of principal abelian varieties attached to certain spin manifolds, due to Witten and Moore-Witten around 2000 and try to place it in a broader framework. This is related to Weil intermediate Jacobians but it also suggests to associate abelian varieties to polarized even weight Hodge structures. The latter construction can also be explained in terms of algebraic groups which might be useful from the point of view of Tannakian categories. The constructions depend on moduli much as in Teichm\"uller theory although the period maps in general are only real analytic. One of the nice features is how the index for certain differential operators canonically associated to …

Teichmüller spaceMathematics - Differential GeometryPure mathematicsMathematics(all)Intermediate JacobianGeneral MathematicsFOS: Physical sciencesTheta functionDirac operatorModulisymbols.namesakeMathematics - Algebraic GeometryMathematics::Algebraic Geometry14K10 14C30 19K56FOS: MathematicsAbelian groupAlgebraic Geometry (math.AG)Mathematical PhysicsMathematicsApplied MathematicsSuperstring theoryMathematical Physics (math-ph)AlgebraDifferential Geometry (math.DG)symbolsAtiyah–Singer index theoremJournal de Mathématiques Pures et Appliquées
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