On the solution of a problem of extended thermoelasticity theory (ETE) by using a complete finite element approach

Om Namha Shivay, Santwana Mukhopadhyay
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引用次数: 2

Abstract

: This paper attempts to apply a complete finite element approach for the solution of problems on coupled dynamical thermoelasticity theory. Presently, we employ the extended thermoelasticity theory proposed by Lord and Shulman (1969) and consider a problem of linear thermoelasticity for the hollow disk with a thermal shock applied on its inner boundary. The thermoelastic equations have been solved using the complete finite element approach, where we have used discretization in the time domain as well as space domain and applied the Galerkin’s approach of the finite element for both time and space domain. We implement our scheme for a particular case and carry out computational work to obtain the numerical solution of the problem. Further, we compare the present results with the solutions obtained by FEM with Newmark time integration method and the solutions obtained by a trans-FEM method in which Laplace transform technique is used for the time domain. We show that, there is a perfect match in solutions of complete finite element approach with trans-finite element method and Newmark method. The efficiency of the method with respect to computation time is also compared with other two methods.
用完全有限元方法求解扩展热弹性理论的一个问题
本文尝试用完全有限元方法求解耦合动力热弹性理论问题。目前,我们采用Lord和Shulman(1969)提出的扩展热弹性理论,考虑在空心圆盘的内边界施加热冲击时的线性热弹性问题。热弹性方程的求解采用完全有限元方法,在时域和空域均采用离散化方法,并在时域和空域均采用伽辽金有限元方法。我们针对一个特殊情况实施了我们的方案,并进行了计算工作以得到问题的数值解。此外,我们还将所得结果与采用Newmark时间积分法的有限元解法和采用拉普拉斯变换技术的时域反有限元解法进行了比较。证明了完全有限元方法的解与跨有限元法和Newmark法的解是完全匹配的。并与其他两种方法在计算时间方面的效率进行了比较。
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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