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Main Authors: Liu, Yang, Yu, Xiang, Dorfmann, Luis
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.11215
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author Liu, Yang
Yu, Xiang
Dorfmann, Luis
author_facet Liu, Yang
Yu, Xiang
Dorfmann, Luis
contents In this paper we present a dimensional reduction to obtain a one-dimensional model to analyze localized necking or bulging in a residually stressed circular cylindrical solid. The nonlinear theory of elasticity is first specialized to obtain the equations governing the homogeneous deformation. Then, to analyze the non-homogeneous part, we include higher order correction terms of the axisymmetric displacement components leading to a three-dimensional form of the total potential energy functional. Details of the reduction to the one-dimensional form are given. We focus on a residually stressed Gent material and use numerical methods to solve the governing equations. Two loading conditions are considered. In the first, the residual stress is maintained constant, while the axial stretch is used as the loading parameter. In the second, we keep the pre-stretch constant and monotonically increase the residual stress until bifurcation occurs. We specify initial conditions, find the critical values for localized bifurcation and compute the change in radius during localized necking or bulging growth. Finally, we optimize material properties and use the one-dimensional model to simulate necking or bulging until the Maxwell values of stretch are reached.
format Preprint
id arxiv_https___arxiv_org_abs_2403_11215
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Reduced model and nonlinear analysis of localized instabilities of residually stressed cylinders under axial stretch
Liu, Yang
Yu, Xiang
Dorfmann, Luis
Soft Condensed Matter
In this paper we present a dimensional reduction to obtain a one-dimensional model to analyze localized necking or bulging in a residually stressed circular cylindrical solid. The nonlinear theory of elasticity is first specialized to obtain the equations governing the homogeneous deformation. Then, to analyze the non-homogeneous part, we include higher order correction terms of the axisymmetric displacement components leading to a three-dimensional form of the total potential energy functional. Details of the reduction to the one-dimensional form are given. We focus on a residually stressed Gent material and use numerical methods to solve the governing equations. Two loading conditions are considered. In the first, the residual stress is maintained constant, while the axial stretch is used as the loading parameter. In the second, we keep the pre-stretch constant and monotonically increase the residual stress until bifurcation occurs. We specify initial conditions, find the critical values for localized bifurcation and compute the change in radius during localized necking or bulging growth. Finally, we optimize material properties and use the one-dimensional model to simulate necking or bulging until the Maxwell values of stretch are reached.
title Reduced model and nonlinear analysis of localized instabilities of residually stressed cylinders under axial stretch
topic Soft Condensed Matter
url https://arxiv.org/abs/2403.11215