Differential forms in synthetic differential supergeometry (Q1805609)
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scientific article; zbMATH DE number 1364316
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Differential forms in synthetic differential supergeometry |
scientific article; zbMATH DE number 1364316 |
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Differential forms in synthetic differential supergeometry (English)
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18 November 1999
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In this note, the definition of superdifferential forms in a super microlinear space is given. Exterior differentiation, Lie derivative and the Cartan formula relating them are described, as well as a De Rham theorem in that framework. Familiarity with synthetic differential geometry, as understood for instance in [\textit{R. Lavendhomme}, `Basic concepts of synthetic differential geometry' (1996; Zbl 0866.58001)], is necessary even to understand some notations.
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superdifferential forms
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synthetic supermanifolds
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0.94034207
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0.90872914
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0.90731627
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0.8982165
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0.8932415
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