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bn:03013317n
Noun Concept
Categories: Calculus of variations, Mathematical analysis stubs
EN
first variation
EN
In applied mathematics and the calculus of variations, the first variation of a functional J is defined as the linear functional δ J {\displaystyle \delta J} mapping the function h to δ J = lim ε → 0 J − J ε = d d ε J | ε = 0, {\displaystyle \delta J=\lim _{\varepsilon \to 0}{\frac {J-J}{\varepsilon }}=\left.{\frac {d}{d\varepsilon }}J\right|_{\varepsilon =0},} where y and h are functions, and ε is a scalar. Wikipedia
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EN
In applied mathematics and the calculus of variations, the first variation of a functional J is defined as the linear functional δ J {\displaystyle \delta J} mapping the function h to δ J = lim ε → 0 J − J ε = d d ε J | ε = 0, {\displaystyle \delta J=\lim _{\varepsilon \to 0}{\frac {J-J}{\varepsilon }}=\left.{\frac {d}{d\varepsilon }}J\right|_{\varepsilon =0},} where y and h are functions, and ε is a scalar. Wikipedia
IS A
linear map
FACET OF
calculus of variations
Wikipedia
EN
first variation
Wikidata
EN
First variation

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