Litcius/Paper detail

Fractional derivative heat transfer for rotating modified couple stress magneto-thermoelastic medium with two temperatures

Samia M. Said

2020Waves in Random and Complex Media17 citationsDOI

Abstract

The present investigation deals with the study of plane waves and the fundamental solution in rotating modified couple stress generalized thermoelastic solid with two-temperatures. The heat conduction equation with the fractional-order derivative and the formulation of the problem is applied in the context of the three-phase-lag model (3PHL), Green–Naghdi theory (G-N III) with energy dissipation and Green–Naghdi theory (G-N II) without energy dissipation. The medium is assumed initially stressed and normal mode analysis will be used to obtain the general solution for any set of boundary conditions. Some comparisons have been shown in figures to estimate the effects of the fractional-order, the hall current, rotation, and modified stress on all the studied fields.

Topics & Concepts

Thermoelastic dampingFractional calculusDissipationMathematical analysisMathematicsStress (linguistics)Context (archaeology)Thermal conductionRotation (mathematics)Heat transferTime derivativeMagnetoBoundary value problemMechanicsPhysicsThermodynamicsThermalGeometryPower (physics)PhilosophyLinguisticsBiologyPaleontologyThermoelastic and Magnetoelastic PhenomenaNumerical methods in engineeringNonlocal and gradient elasticity in micro/nano structures