(Q931001)

English

inverse function theorem

theorem that, if a function is continuously differentiable with nonzero Jacobian determinant at a given point, then it is locally invertible near that point

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a counterexample demonstrating the necessity of continuous differentiability in the inverse function theorem: the function 𝑥+2𝑥²sin(¹⁄𝑥) is differentiable (but not continuously so) at 0 and does not admit a local inverse near 0 (English)

kontraŭekzemplo pri la neceso de kontinua derivebleco en la funkcio de la inversa funkcio: la funkcio 𝑥+2𝑥²sin(¹⁄𝑥) estas derivebla (sed ne kontinue derivebla) ĉe 0, kaj loka inversa funkcio mankas ĉirkaŭ 0 (Esperanto)

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defining formula

{\begin{aligned}&f\in {\mathcal {C}}^{1}(M,N)\\&\det Df(x)\neq 0\implies \exists (x\in U\subset M)\exists (g\colon f(U)\to U)\colon \operatorname {id} _{U}=g\circ f,\;f\circ g=\operatorname {id} _{f(U)}\end{aligned}}

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in defining formula

\det Df

symbol represents

Jacobian determinant

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{\mathcal {C}}^{1}(-,-)

symbol represents

continuously differentiable function

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\operatorname {id}

symbol represents

identity function

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maintained by WikiProject

WikiProject Mathematics

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implicit function theorem

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Identifiers

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Freebase Data Dumps

publication date

28 October 2013

InverseFunctionTheorem

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Microsoft Academic ID

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inverse function theorem

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1 reference

26 January 2022

https://docs.openalex.org/download-snapshot/snapshot-data-format

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