Spatial estimates for Kelvin-Voigt finite elasticity with nonlinear viscosity: Well behaved solutions in space

Quintanilla Ramon; Saccomandi Giuseppe

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Spatial estimates for Kelvin-Voigt finite elasticity with nonlinear viscosity: Well behaved solutions in space

机译：具有非线性粘度的Kelvin-Voigt有限弹性的空间估计：空间中表现良好的解决方案

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摘要

We provide some spatial estimates for the nonlinear partial differential equation governing anti-plane motions in a nonlinear viscoelastic theory of Kelvin-Voigt type when the viscosity is a function of the strain rate. The spatial estimates we prove are an alternative of Phragmen-Lindel of type. These estimates are possible when a precise balance between the elastic and viscoelastic nonlinearities holds.

机译：当粘度是应变速率的函数时，我们为在Kelvin-voigt型非线性粘弹性理论中提供了一些用于抗平面动作的非线性偏微分方程的空间估计。我们证明的空间估计是脊柱林林德林的替代品。当弹性和粘弹性非线性之间的精确平衡持有时，这些估计是可能的。

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来源
《Analysis and applications》 |2020年第6期|共19页
作者
Quintanilla Ramon; Saccomandi Giuseppe;
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作者单位

Univ Politecn Cataluna ESEIAAT Dept Matemat 11 Terrassa Barcelona 08222 Spain;

Univ Perugia Dipartimento Ingn Via G Duranti I-06125 Perugia Italy;

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原文格式 PDF
正文语种 eng
中图分类数学分析;
关键词
Anti-plane shear; nonlinear visco-elasticity; nonlinear viscosity; spatial estimates;

机译：反平面剪切;非线性粘弹性;非线性粘度;空间估计;

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专利

1. 空间形式中具有平均曲率的曲面上强稳定域曲率估计 [J] . 张之正, 雷治军数学季刊：英文版 . 1994,第003期
2. Spatial estimates for Kelvin-Voigt finite elasticity with nonlinear viscosity: Well behaved solutions in space [J] . Quintanilla Ramon, Saccomandi Giuseppe Analysis and applications . 2020,第6期

机译：具有非线性粘度的Kelvin-Voigt有限弹性的空间估计：空间中表现良好的解决方案
3. An a priori error estimate for finite element discretizations in nonlinear elasticity for polyconvex materials under small loads [J] . Carstensen C., Dolzmann G. Numerische Mathematik . 2004,第1期

机译：小载荷下多凸材料非线性弹性有限元离散化的先验误差估计
4. An a priori error estimate for finite element discretizations in nonlinear elasticity for polyconvex materials under small loads [J] . Carsten Carstensen, Georg Dolzmann Numerische Mathematik . 2004,第1期

机译：小载荷下多凸材料非线性弹性有限元离散化的先验误差估计
5. Kelvin-Voigt Fractional Derivative Approach Reduces Parameter Space for Elasticity Imaging [C] . Cecile Coussot, Sureshkumar Kalyanam, Rebecca D. Yapp, IEEE Ultrasonics Symposium . 2007

机译：Kelvin-Voigt Fractional Derivative方法可以减少弹性成像的参数空间
6. A Weak Galerkin Finite Element Method for Parallel Solutions of Linear Elasticity Problems on Unstructured Meshes [D] . Li, Liangwei. 2018

机译：非结构网格上线弹性问题并行求解的弱Galerkin有限元方法
7. Exact and explicit traveling wave solutions to two nonlinear evolution equations which describe incompressible viscoelastic Kelvin-Voigt fluid [O] . Md. Mamunur Roshid, Harun-Or Roshid 2018

机译：两种描述不可压缩粘弹性开尔文-沃伊特流体的非线性演化方程的精确和显式行波解
8. Convergence of the Viscosity Solutions for the System of Nonlinear Elasticity [O] . Zhu Changjiang 1997

机译：非线性弹性系统粘滞解的收敛性
9. Convergence of the Finite Element Solution of a Nonlinear Crack Type Problem in Finite Elasticity [R] . Ohtake, K. 1985

机译：有限弹性非线性裂纹问题有限元解的收敛性

Spatial estimates for Kelvin-Voigt finite elasticity with nonlinear viscosity: Well behaved solutions in space

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