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A novel model of nonlocal thermoelasticity with time derivatives of higher order

Ahmed E. Abouelregal

2020Mathematical Methods in the Applied Sciences90 citationsDOI

Abstract

The objective of this work is to introduce a new system of differential equations describing the nonlocal thermoelasticity theory with higher time derivatives and two‐phase lags. In order to obtain this model, we used the nonlocal continuum theory proposed by Eringen and the methodology of the Taylor series expansion of higher‐order time derivatives. Some generalized thermoelasticity theories follow as limited cases. This model is used to study the thermoelastic interaction in a nonlocal medium. The medium is exposed to an applied magnetic field and a periodic time heat source with a constant strength. Some comparisons have been displayed in figures to estimate the influences of the nonlocal parameter and magnetic field as well as the parameters of higher‐order on all the field quantities.

Topics & Concepts

Thermoelastic dampingMathematicsTaylor seriesConstant (computer programming)Field (mathematics)Mathematical analysisOrder (exchange)Work (physics)Differential equationOrdinary differential equationMagnetic fieldApplied mathematicsPhysicsThermodynamicsPure mathematicsThermalQuantum mechanicsFinanceProgramming languageComputer scienceEconomicsThermoelastic and Magnetoelastic PhenomenaNonlocal and gradient elasticity in micro/nano structuresNumerical methods in engineering
A novel model of nonlocal thermoelasticity with time derivatives of higher order | Litcius