Introduction to mixed hodge modules
WebSaito, M.: Mixed Hodge modules and admissible variations. CRAS Paris 309 (1989) 351–356. MATH Google Scholar Saito, M.: Mixed Hodge modules. Publ. RIMS Kyoto University 26 (1990) 221–333. MATH Google Scholar Saito, M.: Introduction to mixed Hodge modules. RIMS-605, preprint 1987 WebEQUIVARIANT MIXED HODGE MODULES PRAMOD N. ACHAR Abstract. These lecture notes were written to accompany the author’s talk at the workshop on \Mixed Hodge …
Introduction to mixed hodge modules
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WebC. Voisin [Vo]. Also the vast theory of mixed Hodge modules [Sa] is not presented, although it seems unavoidable for subtle analysis of singularities. Plan: 1. Introduction … WebWe develop a ``universal'' support theory for derived categories of constructible (analytic or étale) sheaves, holonomic \(\mathcal{D}\)-modules, mixed Hodge modules and others. As applications we classify such objects up to the tensor triangulated structure and discuss the question of monoidal topological reconstruction of algebraic varieties.
WebMixed Hodge modules \S 3.1 Specialization and prolongation Mixed Hodge modules are defined as those extensions of polarizable Hodge mod-ules which satisfy certain …
In mathematics, mixed Hodge modules are the culmination of Hodge theory, mixed Hodge structures, intersection cohomology, and the decomposition theorem yielding a coherent framework for discussing variations of degenerating mixed Hodge structures through the six functor formalism. Essentially, these objects are a pair of a filtered D-module together with a perverse sheaf such that the functor from the Riemann–Hilbert correspondence sends to . This makes it possible to constru… http://mathserver.neu.edu/robin/Seminars/talknotes/HM_5.pdf
WebCMI Workshop \Mixed Hodge Modules and Their Applications". We give an overview, with an emphasis on applications, of recent developments on the interaction between …
WebWe develop a ``universal'' support theory for derived categories of constructible (analytic or étale) sheaves, holonomic \(\mathcal{D}\)-modules, mixed Hodge modules and others. … harvard business school master programsWebJan 5, 2024 · The main result, whose proof uses the purity of the intersection complex in terms of mixed Hodge modules, is a generalization of the semipurity theorem obtained by Gabber in the l-adic case. harvard business school masters in managementWebA RAPID INTRODUCTION TO HODGE MODULES, OR 0 TO 60 IN 3 HOURS. DONU ARAPURA 1. Classical Hodge theory Our somewhat daunting task is understand what a … harvard business school mba gmat scoreWebmanifold starting from a deformation of a Frobenius module. 1. Introduction Let Xbe a complex manifold. Then, an unpolarized complex variation of Hodge structure (E,∇,F,Φ)¯ over Xconsists of a flat, complex vector bundle (E,∇) over X equipped with a decreasing Hodge filtration F and an increasing filtration Φ¯ such that harvard business school mba deadlinesWebSYMMETRIC PRODUCTS OF MIXED HODGE MODULES LAURENTIU MAXIM, MORIHIKO SAITO, AND JORG SCH URMANN Abstract. Generalizing a theorem of … harvard business school masters programsWebIn this part, we quickly overview the theory of Saito’s mixed Hodge modules to get a global picture of this subject, mainly following [Sch1]. Some difficult points could be left as … harvard business school mba syllabus pdfWebPeriods of integrals on algebraic manifolds: Summary of main results and discussion of open problems. P. Griffiths. Mathematics. 1970. 0. Introduction 229 Par t I. Summary of main … harvard business school my dashboard