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Subanalytic Sheaves and Sobolev Spaces
 
Stéphane Guillermou Université de Grenoble I, Saint-Martin d’Hères
Gilles Lebeau Université Nice Sophia Antipolis, Nice, France
Adam Parusiński Université Nice Sophia Antipolis, Nice, France
Pierre Schapira Université Paris 6, Jussieu, France
Jean-Pierre Schneiders Université de Liège, Belgique
A publication of the Société Mathématique de France
Subanalytic Sheaves and Sobolev Spaces
Softcover ISBN:  978-2-85629-844-2
Product Code:  AST/383
List Price: $52.00
AMS Member Price: $41.60
Please note AMS points can not be used for this product
Subanalytic Sheaves and Sobolev Spaces
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Subanalytic Sheaves and Sobolev Spaces
Stéphane Guillermou Université de Grenoble I, Saint-Martin d’Hères
Gilles Lebeau Université Nice Sophia Antipolis, Nice, France
Adam Parusiński Université Nice Sophia Antipolis, Nice, France
Pierre Schapira Université Paris 6, Jussieu, France
Jean-Pierre Schneiders Université de Liège, Belgique
A publication of the Société Mathématique de France
Softcover ISBN:  978-2-85629-844-2
Product Code:  AST/383
List Price: $52.00
AMS Member Price: $41.60
Please note AMS points can not be used for this product
  • Book Details
     
     
    Astérisque
    Volume: 3832016; 120 pp
    MSC: Primary 16; 18; 32; 46

    Sheaves on manifolds are perfectly suited to treat local problems, but many spaces that one naturally encounter, especially in analysis, are not of a local nature. The subanalytic topology (in the sense of Grothendieck) on real analytic manifolds allows the authors to partially overcome this difficulty and to define, for example, sheaves of functions or distributions with temperate growth but not to make the growth precise.

    In this volume, the authors introduce the linear subanalytic topology, a refinement of the preceding one, and construct various objects of the derived category of sheaves on the subanalytic site with the help of the Brown representability theorem. In particular, they construct the Sobolev sheaves. These objects have the nice property that the complexes of their sections on open subsets with Lipschitz boundaries are concentrated in degree zero and coincide with the classical Sobolev spaces.

    Another application of this topology is that it allows the authors to functorially endow regular holonomic D-modules with filtrations (in the derived sense).

    In the course of the text, the authors also obtain some results on subanalytic geometry and make a detailed study of the derived category of filtered objects in symmetric monoidal categories.

    A publication of the Société Mathématique de France, Marseilles (SMF), distributed by the AMS in the U.S., Canada, and Mexico. Orders from other countries should be sent to the SMF. Members of the SMF receive a 30% discount from list.

    Readership

    Graduate students and research mathematicians interested in sheaves.

  • Additional Material
     
     
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Accessibility – to request an alternate format of an AMS title
Volume: 3832016; 120 pp
MSC: Primary 16; 18; 32; 46

Sheaves on manifolds are perfectly suited to treat local problems, but many spaces that one naturally encounter, especially in analysis, are not of a local nature. The subanalytic topology (in the sense of Grothendieck) on real analytic manifolds allows the authors to partially overcome this difficulty and to define, for example, sheaves of functions or distributions with temperate growth but not to make the growth precise.

In this volume, the authors introduce the linear subanalytic topology, a refinement of the preceding one, and construct various objects of the derived category of sheaves on the subanalytic site with the help of the Brown representability theorem. In particular, they construct the Sobolev sheaves. These objects have the nice property that the complexes of their sections on open subsets with Lipschitz boundaries are concentrated in degree zero and coincide with the classical Sobolev spaces.

Another application of this topology is that it allows the authors to functorially endow regular holonomic D-modules with filtrations (in the derived sense).

In the course of the text, the authors also obtain some results on subanalytic geometry and make a detailed study of the derived category of filtered objects in symmetric monoidal categories.

A publication of the Société Mathématique de France, Marseilles (SMF), distributed by the AMS in the U.S., Canada, and Mexico. Orders from other countries should be sent to the SMF. Members of the SMF receive a 30% discount from list.

Readership

Graduate students and research mathematicians interested in sheaves.

Review Copy – for publishers of book reviews
Accessibility – to request an alternate format of an AMS title
Please select which format for which you are requesting permissions.