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Continuum Mechanics and Thermodynamics

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20-04-2023 | Original Article

Some results on eigenvalue problems in the theory of piezoelectric porous dipolar bodies

Authors: Marin Marin, Andreas Öchsner, Sorin Vlase, Dan O. Grigorescu, Ioan Tuns

Published in: Continuum Mechanics and Thermodynamics | Issue 5/2023

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Abstract

In our study we construct a boundary value problem in elasticity of porous piezoelectric bodies with a dipolar structure To construct an eigenvalue problem in this context, we consider two operators defined on adequate Hilbert spaces. We prove that the two operators are positive and self adjoint, which allowed us to show that any eigenvalue is a real number and two eigenfunctions which correspond to two distinct eigenvalues are orthogonal. With the help of a Rayleigh quotient type functional, a variational formulation for the eigenvalue problem is given. Finally, we consider a disturbation analysis in a particular case. It must be emphasized that the porous piezoelectric bodies with dipolar structure addressed in this study are considered in their general form, i.e.,inhomogeneous and anisotropic.

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Title: Some results on eigenvalue problems in the theory of piezoelectric porous dipolar bodies
Authors: Marin Marin
Andreas Öchsner
Sorin Vlase
Dan O. Grigorescu
Ioan Tuns
Publication date: 20-04-2023
Publisher: Springer Berlin Heidelberg
Published in: Continuum Mechanics and Thermodynamics / Issue 5/2023
Print ISSN: 0935-1175
Electronic ISSN: 1432-0959
DOI: https://doi.org/10.1007/s00161-023-01220-0

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