格里奥定理：使变形最小化的旋转

Q4 Engineering Rakenteiden Mekaniikka Pub Date : 2020-03-30 DOI:10.23998/rm.77296

Martti Mikkola

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引用次数: 0

摘要

本文考虑了著名的G. Grioli定理，根据该定理，变形梯度极分解中的旋转因子使Biot应变张量最小。通过应用于大位移理论中的简单剪切、平面变形、Euler-Bernoulli和Timoshenko梁理论以及空间中的杆单元，证明了该定理。一种解释可能是材料的经济行为:首先发生不引起任何应力的变形部分，然后材料开始抵抗变形。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Griolin teoreema: rotaatio, joka minimoi muodonmuutoksen

In this paper, the celebrated theorem of G. Grioli is considered according to which the rotation factor in the polar decomposition of the deformation gradient minimizes Biot's strain tensor. The theorem is demonstrated by applications to some cases in large displacement theory: simple shear, plane deformation, Euler-Bernoulli and Timoshenko beam theories, and bar element in space. An interpretation could be that the material behaves economically: first occurs the part of deformation which does not induce any stresses and then the material starts to resist the deformation.

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