Jensen-type geometric shapes

Pawe? Pasteczka

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Jensen-type geometric shapes

机译：詹森型几何形状

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We present both necessary and sufficient conditions for a convex closed shape such that for every convex function the average integral over the shape does not exceed the average integral over its boundary. It is proved that this inequality holds for n -dimensional parallelotopes, n -dimensional balls, and convex polytopes having the inscribed sphere (tangent to all its facets) with the centre in the centre of mass of its boundary.

机译：我们给出了凸封闭形状的必要条件和充分条件，使得对于每个凸函数，形状上的平均积分不会超过其边界上的平均积分。证明了这种不等式适用于具有内切球体（与所有小平面切线）且中心在其边界质量中心的n维平行同位素，n维球和凸多面体。

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《Annales Academiae Paedagogicae Cracoviensis. Studia Mathematica》 |2020年第1期|共7页
作者
Pawe? Pasteczka;
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中图分类教育;
关键词
ShapesPlatonic shapessphereballJensen's inequality;

机译：形状柏拉图形状球形球詹森不等式;
入库时间 2022-08-18 07:53:35

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机译：詹森型几何形状
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3. 3D geometric model for shape design (2nd report) -3D geometric model focused on shape feature generating rules- [J] . Ichiro Nagasaka, Atsushi Yamagishi, Toshiharu Taura 精密工学会誌 . 1997,第2期

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Jensen-type geometric shapes

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