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- Differentiation_in_Fréchet_spaces abstract "In mathematics, in particular in functional analysis and nonlinear analysis, it is possible to define the derivative of a function between two Fréchet spaces. This notion of differentiation is significantly weaker than the derivative in a Banach space. Nevertheless, it is the weakest notion of differentiation for which many of the familiar theorems from calculus hold. In particular, the chain rule is true. With some additional constraints on the Fréchet spaces and functions involved, there is an analog of the inverse function theorem called the Nash–Moser inverse function theorem, having wide applications in nonlinear analysis and differential geometry.".
- Differentiation_in_Fréchet_spaces wikiPageID "5480302".
- Differentiation_in_Fréchet_spaces wikiPageRevisionID "605376791".
- Differentiation_in_Fréchet_spaces subject Category:Differential_calculus.
- Differentiation_in_Fréchet_spaces subject Category:Generalizations_of_the_derivative.
- Differentiation_in_Fréchet_spaces subject Category:Topological_vector_spaces.
- Differentiation_in_Fréchet_spaces comment "In mathematics, in particular in functional analysis and nonlinear analysis, it is possible to define the derivative of a function between two Fréchet spaces. This notion of differentiation is significantly weaker than the derivative in a Banach space. Nevertheless, it is the weakest notion of differentiation for which many of the familiar theorems from calculus hold. In particular, the chain rule is true.".
- Differentiation_in_Fréchet_spaces label "Differentiation in Fréchet spaces".
- Differentiation_in_Fréchet_spaces sameAs Differentiation_in_Fr%C3%A9chet_spaces.
- Differentiation_in_Fréchet_spaces sameAs Q5275381.
- Differentiation_in_Fréchet_spaces sameAs Q5275381.
- Differentiation_in_Fréchet_spaces wasDerivedFrom Differentiation_in_Fréchet_spaces?oldid=605376791.