Some computational aspects of homogenization of thermopiezoelectric composites
Abstract
On the basis of the paper [1] two topics are discussed. Firstly, exact formulae for the homogenized coefficients of a layered thermopiezoelectric composite are derived. Secondly, by applying the Ritz method, the local problems are solved approximately. Specific cases are also examined and illustrated.
Keywords
References
[1] A. Gałka, J.J. Telega and R. Wojnar. Homogenization and thermopiezoelectricity. Mech. Res. Comm., 19: 315- 324, 1992.[2] J.J. Telega. Piezoelectricity and homogenization. Application to biomechanics. In: G.A. Maugin, ed. Continuum Models and Discrete Systems, Vol. 2, 220-229, Longman, Essex, 1991.
[3] N. Turbé and G.A. Maugin. On the linear piezoelectricity of composite materials. Math. Meth.in the Appl. Sci., 14: 403- 412, 1991.
[4] Y. Benveniste. The determination of the elastic and electric fields in a piezoelectric inhomogeneity. J. Appl. Phys., 72: 1086- 1095, 1992.
[5] Y. Benveniste. Universal relations in piezoelectric composites with eigenstress and polarization fields, Part I: Binary media - local fields and effective behavior. J. Appl. Mech., 60: 265-269, 1993; Part II: Multiphase media - effective behavior, ibid., 270-275
Published
Jul 14, 2023
How to Cite
GAŁKA, Andrzej; TELEGA, Józef Joachim; WOJNAR, Ryszard.
Some computational aspects of homogenization of thermopiezoelectric composites.
Computer Assisted Methods in Engineering and Science, [S.l.], v. 3, n. 2, p. 133-154, july 2023.
ISSN 2956-5839.
Available at: <https://cames.ippt.pan.pl/index.php/cames/article/view/1453>. Date accessed: 03 july 2024.
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This work is licensed under a Creative Commons Attribution 4.0 International License.
