String topology for stacks /
We establish the general machinery of string topology for differentiable stacks. This machinery allows us to treat on an equal footing free loops in stacks and hidden loops. In particular, we give a good notion of a free loop stack, and of a mapping stack $\map(Y,\XX)$, where $Y$ is a compact space...
| Corporate Authors: | , , |
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| Other Authors: | |
| Format: | Book |
| Language: | English |
| Published: |
Paris :
Société mathématique de France,
[2012], ©2012
Paris : Société mathématique de France, c2012 Paris : c2012 Paris : ©2012 Paris : [2012] |
| Series: | Astérisque ;
343 Astérisque 343 Astérisque 343 |
| Subjects: |
| Summary: | We establish the general machinery of string topology for differentiable stacks. This machinery allows us to treat on an equal footing free loops in stacks and hidden loops. In particular, we give a good notion of a free loop stack, and of a mapping stack $\map(Y,\XX)$, where $Y$ is a compact space and $\XX$ a topological stack, which is functorial both in $\XX$ and $Y$ and behaves well enough with respect to pushouts. We also construct a bivariant (in the sense of Fulton and MacPherson) theory for topological stacks: it gives us a flexible theory of Gysin maps which are automatically compatible with pullback, pushforward and products. Further we prove an excess formula in this context. We introduce oriented stacks, generalizing oriented manifolds, which are stacks on which we can do string topology. We prove that the homology of the free loop stack of an oriented stack and the homology of hidden loops (sometimes called ghost loops) are a Frobenius algebra which are related by a natural morphism of Frobenius algebras. We also prove that the homology of free loop stack has a natural structure of a BV-algebra, which together with the Frobenius structure fits into an homological conformal field theories with closed positive boundaries. Using our general machinery, we construct an intersection pairing for (non necessarily compact) almost complex orbifolds which is in the same relation to the intersection pairing for manifolds as Chen-Ruan orbifold cup-product is to ordinary cup-product of manifolds. We show that the hidden loop product of almost complex is isomorphic to the orbifold intersection pairing twisted by a canonical class. Finally we gave some examples including the case of the classifying stacks [*/G] of a compact Lie group |
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| Item Description: | "Publié avec le concours du Centre National de la Recherche Scientifique." "Publié avec le concours du Centre National de la Recherche Scientifique." |
| Physical Description: | xiv, 169 p. : ill ; 24 cm xiv, 169 p. : ill. ; 24 cm xiv, 169 pages : illustrations ; 24 cm |
| Bibliography: | Includes bibliographical references (p. [165]-169) Includes bibliographical references (pages [165]-169) |
| ISBN: | 2856293425 (pbk.) 2856293425 9782856293423 (pbk.) 9782856293423 |
| ISSN: | 0303-1179 ; |