Approximation of bodies of constant width and reduced bodies in a normed plane

Lassak M.

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Approximation of bodies of constant width and reduced bodies in a normed plane

机译：等宽实体和缩小实体在规范平面中的逼近

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We prove that for every ε>0 and for every convex body of constant width in a normed plane there exists a convex body of the same constant width whose boundary consists only of arcs of circles in the sense of the norm such that the Hausdorff distance between the two bodies is at most ε.This generalizes the Euclidean case proved by Blaschke.We also present a more general theorem about approximation of reduced bodies.

机译：我们证明对于范数平面中的每个ε> 0以及恒定宽度的每个凸体，存在一个恒定宽度相同的凸体，其边界在范数的意义上仅由圆弧组成，使得之间的Hausdorff距离这两个物体至多为ε。这概括了Blaschke证明的欧几里得情形。我们还给出了关于简化物体逼近的更一般性定理。

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《Journal of convex analysis》 |2012年第3期|共10页
作者
Lassak M.;
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正文语种 eng
中图分类数学分析;
关键词
Approximation; Body of constant width; Hausdorff distance; Normed plane; Reduced convex body;

机译：逼近;等宽体;Hausdorff距离;范平面;缩小凸体;

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1. Approximation of bodies of constant width and reduced bodies in a normed plane [J] . Lassak M. Journal of convex analysis . 2012,第3期

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2. Reduced bodies in normed planes [J] . Fabinska E, Lassak M Israel Journal of Mathematics . 2007,第0期

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Approximation of bodies of constant width and reduced bodies in a normed plane

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