In convex geometry, the projection body of a convex body in n-dimensional Euclidean space is the convex body such that for any vector , the support function of in the direction u is the (n – 1)-dimensional volume of the projection of K onto the hyperplane orthogonal to u. Minkowski showed that the projection body of a convex body is convex. and used projection bodies in their solution to Shephard's problem. For a convex body, let denote the polar body of its projection body. There are two remarkable affine isoperimetric inequality for this body. proved that for all convex bodies ,
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| - Projection body (en)
- Тело сечений (ru)
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| - Тело сечений — конструкция, дающая тело для данного тела евклидова пространства. Определение было дано Лютваком в 1988 году.Эта конструкция сыграла заметную роль в решении задачи Буземана — Петти. (ru)
- In convex geometry, the projection body of a convex body in n-dimensional Euclidean space is the convex body such that for any vector , the support function of in the direction u is the (n – 1)-dimensional volume of the projection of K onto the hyperplane orthogonal to u. Minkowski showed that the projection body of a convex body is convex. and used projection bodies in their solution to Shephard's problem. For a convex body, let denote the polar body of its projection body. There are two remarkable affine isoperimetric inequality for this body. proved that for all convex bodies , (en)
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| - In convex geometry, the projection body of a convex body in n-dimensional Euclidean space is the convex body such that for any vector , the support function of in the direction u is the (n – 1)-dimensional volume of the projection of K onto the hyperplane orthogonal to u. Minkowski showed that the projection body of a convex body is convex. and used projection bodies in their solution to Shephard's problem. For a convex body, let denote the polar body of its projection body. There are two remarkable affine isoperimetric inequality for this body. proved that for all convex bodies , where denotes the n-dimensional unit ball and is n-dimensional volume, and there is equality precisely for ellipsoids. proved that for all convex bodies , where denotes any -dimensional simplex, and there is equality precisely for such simplices. The intersection body IK of K is defined similarly, as the star body such that for any vector u the radial function of IK from the origin in direction u is the (n – 1)-dimensional volume of the intersection of K with the hyperplane u⊥.Equivalently, the radial function of the intersection body IK is the Funk transform of the radial function of K.Intersection bodies were introduced by . showed that a centrally symmetric star-shaped body is an intersection body if and only if the function 1/||x|| is a positive definite distribution, where ||x|| is the homogeneous function of degree 1 that is 1 on the boundary of the body, and used this to show that the unit balls lpn, 2 < p ≤ ∞ in n-dimensional space with the lp norm are intersection bodies for n=4 but are not intersection bodies for n ≥ 5. (en)
- Тело сечений — конструкция, дающая тело для данного тела евклидова пространства. Определение было дано Лютваком в 1988 году.Эта конструкция сыграла заметную роль в решении задачи Буземана — Петти. (ru)
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