Yamamuro S. — Differential Calculus in Topological Linear Spaces :: Электронная библиотека попечительского совета мехмата МГУ

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Yamamuro S. — Differential Calculus in Topological Linear Spaces

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Название: Differential Calculus in Topological Linear Spaces

Автор: Yamamuro S.

Язык:

Рубрика: Математика/

Статус предметного указателя: Готов указатель с номерами страниц

ed2k: ed2k stats

Год издания: 1974

Количество страниц: 179

Добавлена в каталог: 18.11.2008

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Предметный указатель

$C_{p}$ -mapping      3.4
$\mathcal{B}$ -compact (-precompact) mapping      2.1
( $M_{1}, M_{2}$ )-preserving      3.2
(LS)-space      1.7
Absolutely continuous      6.2
Almost $C^{n}$ -diffeomorphic      5.2
Automorphism of near-rings      7.3
Automorphism of semigroups      7.2
Bounded variation      6.2
Boundedly levered      Appendix 3
Chain rule      1.2
Compact mapping      2.1
Compactly generated      Appendix 1
Completely bounded operator      3.3
Composition mapping      3.1
Composition property      1.2
Constant mapping      7.2
Continuous S-category      5.1
D-ideal      7.3
Differentiability of $L^{p}$ -norms      4.5
Differentiability of Lipschitz mappings      6.1
Differentiability of supremum norms      4.4
Directional derivative      1.1
Equicontinuously differentiable      1.9
Frechet derivative      1.2
Frechet differentiability of semi-norms      4.2
Gateaux derivative      1.2
Hadamard derivative      1.2
Hadamard differentiability of semi-norms      4.1
Hadamard — Levy theorem      3.5
Higher derivatives      1.8
Higher derivatives of semi-norms      4.3
Higher order chain rules      1.8
Ideals of near-rings      7.3
Idempotents      7.1
Inductive limit      1.6
Inverse mapping theorem      3.4
Inverse operation      3.1
Inverse to Taylor's theorem      1.8

Khintichine's theorem      6.2
Levered      Appendix 3
Lipschitzian      1.4
Local injection theorem      3.5
Local surjection theorem      3.5
M-derivative      1.2
Magill's theorem      7.2
Mazur's theorem      4.1
Mean Value Theorems      1.3
Open mapping theorem      3.5
p-bounded mapping      3.3
Partial derivative      1.11
Peak point      4.4
Peaking function      4.4
Precompact mapping      2.1
Projective topology      1.5
Pseudodifferentiable      6.1
Quasi-differentiable      1.2
Restrepo's theorem      4.2
S (E, R)-topology      5.2
S-approximation property      5.3
S-category      5.1
S-normal      5.3
S-partition of unity      5.3
S-smooth mapping      5.1
S-smooth space      5.2
Separably valued      6.1
SEQUENTIAL      1.7
Split $C^{n}$ -imbedding theorem      3.5
Split $C^{n}$ -projection theorem      3.5
Stepanoff mapping      6.2
Strongly continuous      2.1
Strongly differentiable      1.7
Strongly S-smooth space      5.2
Taylor's theorem      1.8
Uniformly differentiable      1.10
Weakly dense      6.1
Whitfield's theorem      5.2
Zygmund's theorem      6.2

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