Some results on eigenvalue problems in the theory of piezoelectric porous dipolar bodies
DOI10.1007/S00161-023-01220-0zbMath1523.74003OpenAlexW4366522194MaRDI QIDQ6060157
Ioan Tuns, Sorin Vlase, Andreas Öchsner, Dan O. Grigorescu, Marin I. Marin
Publication date: 3 November 2023
Published in: Continuum Mechanics and Thermodynamics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00161-023-01220-0
eigenvalue problemRayleigh quotientvariational approachboundary value problempiezoelectricitydisturbation analysis
Fluid-solid interactions (including aero- and hydro-elasticity, porosity, etc.) (74F10) Electromagnetic effects in solid mechanics (74F15) Polar materials (74A35) Spectral and related methods applied to problems in solid mechanics (74S25)
Cites Work
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- Some theorems in the theory of microstretch thermopiezoelectricity
- Uniqueness theorem and Hamilton's principle in linear micropolar thermopiezoelectric/piezomagnetic continuum with two relaxation times
- A generalized linear thermoelasticity theory for piezoelectric media
- Thermodynamic theory for porous piezoelectric materials
- Uniqueness theorem in the linear theory of piezoelectric micropolar thermoelasticity
- An initial boundary value problem for modeling a piezoelectric dipolar body
- Equations of high frequency vibrations of thermopiezoelectric crystal plates
- New analytical method based on dynamic response of planar mechanical elastic systems
- High frequency vibrations of piezoelectric crystal plates
- Reciprocity, uniqueness and minimum principles in the linear theory of piezoelectricity
- A uniqueness theorem in the dynamical theory of piezoelectricity
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