Dyadics
In mathematics, specifically multilinear algebra, a dyadic or dyadic tensor is a second order tensor, written in a notation that fits in with vector algebra. There are numerous ways to multiply two Euclidean vectors. The dot product takes in two vectors and returns a scalar, while the cross product returns a pseudovector. Both of these have various significant geometric interpretations and are widely used in mathematics, physics, and engineering. The dyadic product takes in two vectors and returns a second order tensor called a dyadic in this context. A dyadic can be used to contain physical or geometric information, although in general there is no direct way of geometrically interpreting it.
APL (programming language)Airy wave theoryBounded deformationCartesian tensorCauchy momentum equationChapman–Enskog theoryCrystal plasticityDelDerivation of the Navier–Stokes equationsDiadicDiadic productDirac delta functionDot productDouble-dot productDyadDyad productDyadicDyadic productDyadic tensorElectromagnetic wave equationGeometric algebraGlossary of tensor theoryGradientIndex of physics articles (D)Josiah_Willard_GibbsLaplace–Runge–Lenz vectorList of mathematical symbols by subjectMatrix determinant lemmaMatrix multiplicationMaxwell stress tensorMultilinear algebraNavier–Stokes equationsOuter productPlasma (physics)PseudovectorQuantization of the electromagnetic fieldRadiation stressSpectral theoryStigma managementStrassen algorithm
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Dyadics
In mathematics, specifically multilinear algebra, a dyadic or dyadic tensor is a second order tensor, written in a notation that fits in with vector algebra. There are numerous ways to multiply two Euclidean vectors. The dot product takes in two vectors and returns a scalar, while the cross product returns a pseudovector. Both of these have various significant geometric interpretations and are widely used in mathematics, physics, and engineering. The dyadic product takes in two vectors and returns a second order tensor called a dyadic in this context. A dyadic can be used to contain physical or geometric information, although in general there is no direct way of geometrically interpreting it.
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Das dyadische Produkt (kurz au ...... er Vektoranalysis formulierte.
@de
Een dyade of dyadisch product ...... oren: kan dan afgeleid worden.
@nl
Iloczyn diadyczny – to iloczyn ...... iloczynu tensorowego macierzy.
@pl
In matematica, specialmente ne ...... perazione di prodotto diadico.
@it
In mathematics, specifically m ...... and single over- or underbars.
@en
Диа́да — это специальный тензо ...... таких «одностолбцовых» матриц.
@ru
Діада — це тензор другого ранг ...... вектора і проводить обертання:
@uk
在多重線性代數裡,並矢張量(dyadic tensor)是一 ...... 並矢, 、 、 等等,都是並矢。 並矢張量 也可以表達為 。
@zh
多重線型代数学における二項積(にこうせき、英: dyadic ...... 重および一重の上付きまたは下付きのバーを付けるものがある。)
@ja
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Das dyadische Produkt (kurz au ...... as Dachprodukt verwendet wird.
@de
Een dyade of dyadisch product ...... oren: kan dan afgeleid worden.
@nl
Iloczyn diadyczny – to iloczyn ...... iloczynu tensorowego macierzy.
@pl
In matematica, specialmente ne ...... perazione di prodotto diadico.
@it
In mathematics, specifically m ...... geometrically interpreting it.
@en
Диа́да — это специальный тензо ...... таких «одностолбцовых» матриц.
@ru
Діада — це тензор другого ранг ...... вектора і проводить обертання:
@uk
在多重線性代數裡,並矢張量(dyadic tensor)是一 ...... 並矢, 、 、 等等,都是並矢。 並矢張量 也可以表達為 。
@zh
多重線型代数学における二項積(にこうせき、英: dyadic ...... 重および一重の上付きまたは下付きのバーを付けるものがある。)
@ja
label
Diade (matematica)
@it
Dyade (wiskunde)
@nl
Dyadics
@en
Dyadisches Produkt
@de
Iloczyn diadyczny
@pl
Tenseur dyadique
@fr
Диада
@ru
Діада
@uk
並矢張量
@zh
二項積
@ja