Mechanics of Solids
A Journal of Russian Academy of Sciences

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Issues > Archive of Issues > 2024-4 > pp.2387-2394

Archive of Issues

Total articles in the database:		12949
In Russian (Изв. РАН. МТТ):		8096
In English (Mech. Solids):		4853

<< Previous article \| Volume 59, Issue 4 / 2024 \| Next article >>
E.V. Murashkin and Yu.N. Radayev, "Coupled Harmonic Plane Waves in a Semi-Isotropic Thermoelastic Medium," Mech. Solids. 59 (4), 2387-2394 (2024)
Year	2024	Volume	59	Number	4	Pages	2387-2394
DOI	10.1134/S0025654424700316
Title	Coupled Harmonic Plane Waves in a Semi-Isotropic Thermoelastic Medium
Author(s)	E.V. Murashkin (Ishlinsky Institute for Problems in Mechanics RAS, Moscow, 119526 Russia, murashkin@ipmnet.ru) Yu.N. Radayev (Ishlinsky Institute for Problems in Mechanics RAS, Moscow, 119526 Russia, radayev@ipmnet.ru)
Abstract	The present paper deals with problems of propagation of plane harmonic coupled waves of temperature increment, translational and spinor displacements in a semi-isotropic thermoelastic solid. The requisite constitutive and differential equations of semi-isotropic solids are revisited. Dispersion equation for the wavenumbers of plane harmonic coupled thermoelastic longitudinal waves (bicubic algebraic equation) are obtained and analyzed. Dispersion equations for the transverse waves (equation of the 8th algebraic degree) are splitted into two algebraic quartic equations and then solved. For a longitudinal wave, the complex amplitudes of temperature increment, translational displacements and spin–vector are coupled, unlike a transverse wave. The roots of mentioned algebraic equations are calculated by using the Wolfram Mathematica 13 symbolic computing system. The normal wavenumbers with positive real part are discriminated.
Keywords	micropolar thermoelasticity, semiisotropic solid, translational displacement, spinor displacement, plane harmonic wave, longitudinal wave, transverse wave, wavenumber, complex amplitude, phase plane, dispersion equation
Received	10 May 2024	Revised	23 May 2024	Accepted	27 June 2024
Link to Fulltext	https://link.springer.com/article/10.1134/S0025654424700316
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