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Differential Calculus on -Graded Manifolds

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  • G. Sardanashvily
  • W. Wachowski

Abstract

The differential calculus, including formalism of linear differential operators and the Chevalley–Eilenberg differential calculus, over -graded commutative rings and on -graded manifolds is developed. This is a straightforward generalization of the conventional differential calculus over commutative rings and also is the case of the differential calculus over Grassmann algebras and on -graded manifolds. We follow the notion of an -graded manifold as a local-ringed space whose body is a smooth manifold . A key point is that the graded derivation module of the structure ring of graded functions on an -graded manifold is the structure ring of global sections of a certain smooth vector bundle over its body . Accordingly, the Chevalley–Eilenberg differential calculus on an -graded manifold provides it with the de Rham complex of graded differential forms. This fact enables us to extend the differential calculus on -graded manifolds to formalism of nonlinear differential operators, by analogy with that on smooth manifolds, in terms of graded jet manifolds of -graded bundles.

Suggested Citation

  • G. Sardanashvily & W. Wachowski, 2017. "Differential Calculus on -Graded Manifolds," Journal of Mathematics, Hindawi, vol. 2017, pages 1-19, January.
    • Handle: RePEc:hin:jjmath:8271562
    DOI: 10.1155/2017/8271562
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    References listed on IDEAS

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    1. Gennadi Sardanashvily, 2002. "Cohomology of the variational complex in the class of exterior forms of finite jet order," International Journal of Mathematics and Mathematical Sciences, Hindawi, vol. 30, pages 1-9, January.
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