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1 Frechet derivative
Большой англо-русский и русско-английский словарь > Frechet derivative
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2 Frechet derivative
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3 Frechet derivative
производная f ФрешеАнглийский-русский словарь по теории вероятностей, статистике и комбинаторике > Frechet derivative
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4 Frechet derivative
Математика: производная Фреше -
5 Frechet derivative
физ. -
6 derivative
1) матем. производная2) производная величина || производный3) метал. побочный продукт• -
7 derivative
1) производная
2) производная величина
3) производный
4) относящийся к производной
5) модификация
– areolar derivative
– central derivative
– covariant derivative
– derivative action
– derivative block
– derivative control
– derivative equalizer
– derivative gain
– derivative matrix
– derivative of a quotient
– derivative of an element
– derivative of vector
– derivative on the left
– directional derivative
– extrinsic derivative
– forward derivative
– fractional derivative
– Frechet derivative
– higher derivative
– intrinsic derivative
– left-hand derivative
– normal derivative
– partial derivative
– particle derivative
– right derivative
– second-order derivative
– stability derivative
– time derivative
– total derivative -
8 derivative
nounпроизводная fАнглийский-русский словарь по теории вероятностей, статистике и комбинаторике > derivative
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9 производная Фреше
Большой англо-русский и русско-английский словарь > производная Фреше
См. также в других словарях:
Fréchet derivative — In mathematics, the Fréchet derivative is a derivative defined on Banach spaces. Named after Maurice Fréchet, it is commonly used to formalize the concept of the functional derivative used widely in mathematical analysis, especially functional… … Wikipedia
Derivative (generalizations) — Derivative is a fundamental construction of differential calculus and admits many possible generalizations within the fields of mathematical analysis, combinatorics, algebra, and geometry. Derivatives in analysis In real, complex, and functional… … Wikipedia
Derivative — This article is an overview of the term as used in calculus. For a less technical overview of the subject, see Differential calculus. For other uses, see Derivative (disambiguation) … Wikipedia
Fréchet space — This article is about Fréchet spaces in functional analysis. For Fréchet spaces in general topology, see T1 space. For the type of sequential space, see Fréchet Urysohn space. In functional analysis and related areas of mathematics, Fréchet… … Wikipedia
Gâteaux derivative — In mathematics, the Gâteaux differential is a generalisation of the concept of directional derivative in differential calculus. Named after René Gâteaux, a French mathematician who died young in World War I, it is defined for functions between… … Wikipedia
Generalizations of the derivative — The derivative is a fundamental construction of differential calculus and admits many possible generalizations within the fields of mathematical analysis, combinatorics, algebra, and geometry. Contents 1 Derivatives in analysis 1.1 Multivariable… … Wikipedia
Quasi-derivative — In mathematics, the quasi derivative is one of several generalizations of the derivative of a function between two Banach spaces. The quasi derivative is a slightly stronger version of the Gâteaux derivative, though weaker than the Fréchet… … Wikipedia
Malliavin derivative — In mathematics, the Malliavin derivative is a notion of derivative in the Malliavin calculus. Intuitively, it is the notion of derivative appropriate to paths in classical Wiener space, which are usually not differentiable in the usual… … Wikipedia
Maurice René Fréchet — Born September 2, 1878(1878 0 … Wikipedia
Directional derivative — In mathematics, the directional derivative of a multivariate differentiable function along a given vector V at a given point P intuitively represents the instantaneous rate of change of the function, moving through P in the direction of V. It… … Wikipedia
Functional derivative — In mathematics and theoretical physics, the functional derivative is a generalization of the directional derivative. The difference is that the latter differentiates in the direction of a vector, while the former differentiates in the direction… … Wikipedia
