Numerical solution of Lord-Shulman thermopiezoelectricity dynamical problem

Stelmashchuk, Vitaliy; Shynkarenko, H. А.

doi:10.1063/1.5019051

Cited by 3 publications

(1 citation statement)

References 14 publications

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“…In Ref. 23, the authors considered the numerical solution of the Lord–Shulman thermopiezoelectricity dynamical problem. A model of the equations of generalized thermoelasticity based on the Lord–Shulman theory in an isotropic elastic medium under the dependence of the modulus of elasticity on the reference temperature was established in Ref.…”

Section: Introductionmentioning

confidence: 99%

Nonuniform laminated beam of Lord–Shulman type

et al. 2022

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The nonuniform thermoelastic laminated beam of the Lord–Shulman type is considered. The model is a two‐layered beam with structural damping due to the interfacial slip. The well‐posedness is proved by the semigroup theory of linear operators approach together with the Lumer–Phillips theorem. The stability results presented in this paper depend on the nature of a stability function χfalse(xfalse)$\chi (x)$, which we define in (12). We first prove the lack of exponential stability of the system if χfalse(xfalse)≠0$\chi (x)\ne 0$, x∈false(0,1false)$x\in (0,1)$. And then, we establish the exponential stability for χfalse(xfalse)≡0$\chi (x) \equiv 0$ and polynomial decay with rate t−12$t^{-\frac{1}{2}}$ provided χfalse(xfalse)≠0$\chi (x)\ne 0$, x∈false(0,1false)$x\in (0,1)$. The result is new, and it is the first time that the nonuniform laminated beam is considered.

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Section: Introductionmentioning

confidence: 99%

Nonuniform laminated beam of Lord–Shulman type

et al. 2022

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Stability of hybrid time integration scheme for Lord–Shulman thermopiezoelectricity

Stelmashchuk,

Shynkarenko

2024

Results in Applied Mathematics

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Fractional Order Thermoelasticity for Piezoelectric Materials

Deng

2021

Fractals

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This work is aimed at establishing a unified fractional thermoelastic model for piezoelectric structures, and shedding light on the influence of different definitions on the transient responses. Theoretically, based upon Cattaneo-type equation, a unified form of fractional heat conduction law is proposed by adopting Caputo Fabrizio fractional derivative, Atangana Baleanu fractional derivative and Tempered Caputo fractional derivative. Then, thermoelastic model of fractional order is formulated for piezoelastic materials by combining the unified heat conduction law and the governing equations of elastic and electric fields. Numerically, the present theoretical model is applied to study the transient responses of piezoelectric medium that is subjected to a thermal shock. The governing equations are analytically derived and numerically solved with the aids of Laplace transform method. The obtained results are graphically illustrated, and the influences of different definitions of fractional derivative and different fractional order are revealed. This work may be helpful for understanding the multi-coupling effect of elastic, thermal and electric fields, and for inspiring further developments of fractional calculus.

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Numerical solution of Lord-Shulman thermopiezoelectricity dynamical problem

Cited by 3 publications

References 14 publications

Nonuniform laminated beam of Lord–Shulman type

Nonuniform laminated beam of Lord–Shulman type

Stability of hybrid time integration scheme for Lord–Shulman thermopiezoelectricity

Fractional Order Thermoelasticity for Piezoelectric Materials

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