Английская Википедия:Isoperimetric ratio

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Версия от 08:38, 27 марта 2024; EducationBot (обсуждение | вклад) (Новая страница: «{{Английская Википедия/Панель перехода}} In analytic geometry, the '''isoperimetric ratio''' of a simple closed curve in the Euclidean plane is the ratio {{math|''L''<sup>2</sup>/''A''}}, where {{mvar|L}} is the length of the curve and {{mvar|A}} is its area. It is a dimensionless quantity that is invariant under Similarity (geometry)|similarity transf...»)
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In analytic geometry, the isoperimetric ratio of a simple closed curve in the Euclidean plane is the ratio Шаблон:Math, where Шаблон:Mvar is the length of the curve and Шаблон:Mvar is its area. It is a dimensionless quantity that is invariant under similarity transformations of the curve.

According to the isoperimetric inequality, the isoperimetric ratio has its minimum value, 4Шаблон:Pi, for a circle; any other curve has a larger value.[1] Thus, the isoperimetric ratio can be used to measure how far from circular a shape is.

The curve-shortening flow decreases the isoperimetric ratio of any smooth convex curve so that, in the limit as the curve shrinks to a point, the ratio becomes 4Шаблон:Pi.[2]

For higher-dimensional bodies of dimension d, the isoperimetric ratio can similarly be defined as Шаблон:Math where B is the surface area of the body (the measure of its boundary) and V is its volume (the measure of its interior).[3] Other related quantities include the Cheeger constant of a Riemannian manifold and the (differently defined) Cheeger constant of a graph.[4]

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