Diffraction of Acoustic Harmonic Waves in a Viscoelastic Cylinder
Diffraction of Acoustic Harmonic Waves in a Viscoelastic Cylinder |
||
 |
 |
|
| © 2023 by IJETT Journal | ||
| Volume-71 Issue-8 |
||
| Year of Publication : 2023 | ||
| Author : N.U. Kuldashov, B.Z. Nuriddinov, M. Choriev, A. Sh.Ruzimov, Sh. F. Xalilov |
||
| DOI : 10.14445/22315381/IJETT-V71I8P236 | ||
How to Cite?
N.U. Kuldashov, B.Z. Nuriddinov, M. Choriev, A. Sh.Ruzimov, Sh. F. Xalilov , "Diffraction of Acoustic Harmonic Waves in a Viscoelastic Cylinder," International Journal of Engineering Trends and Technology, vol. 71, no. 8, pp. 421-427, 2023. Crossref, https://doi.org/10.14445/22315381/IJETT-V71I8P236
Abstract
The study is devoted to the study of the diffraction process of acoustic waves in a viscoelastic deformable cylinder. The study aims to study the diffraction of acoustic harmonic waves in a viscoelastic cylinder. The solution to the problem of diffraction of acoustic waves in a viscoelastic cylinder is obtained. This will allow us to determine the force factors in the form of the stress-strain state of the deformable cylinder. In the case of steady oscillations, the Helmholtz equation describes the propagation of small disturbances in an acoustic medium. And in a viscoelastic homogeneous isotropic cylinder - scalar and vector Helmholtz equations with complex coefficients. The stress and displacement of a point of a viscoelastic cylinder take on a maximum value in the region of long waves. The stresses and displacements of the points of the viscoelastic cylinder reach their maximum in the region of long waves. A method for solving and an algorithm for the problem of diffraction of acoustic waves in a viscoelastic cylinder have been developed.
Keywords
Viscoelastic cylinder, Wave, Wave equation, Hereditary integral, Bessel equation.
References
[1] A.N. Guz, V.D. Kubenko, and M.A. Cherevko “Diffraction of Elastic Waves,” Soviet Applied Mechanics, vol. 14, pp. 789-798, 1978.
[CrossRef] [Google Scholar] [Publisher Link]
[2] S. Yu. Babich, A. N. Guz', and A. P. Zhuk, “Elastic Waves in Bodies with Initial Stresses,” Soviet Applied Mechanics, vol. 15, pp. 277-291, 1979.
[CrossRef] [Google Scholar] [Publisher Link]
[3] M.A. Isakovich, General Acoustics, Nauka, Moscow, 1973.
[4] Ismoil Safarov et al., “Vibrations of Cylindrical Shell Structures Filled with Layered Viscoelastic Material,” E3S Web of Conferences, vol. 264, p. 01027, 2021.
[CrossRef] [Google Scholar] [Publisher Link]
[5] Konstantin A. Naugolnykh, and Lev A. Ostrovsky, “Nonlinear Wave Processes in Acoustics,” Acoustical Society of America, vol. 108, no. 1, 2000.
[Google Scholar] [Publisher Link]
[6] Ismoil Safarov et al., “Manometric Tubular Springs Oscillatory Processes Modeling with Consideration of its Viscoelastic Properties,” E3S Web of Conferences, vol. 264, p. 01010, 2021.
[CrossRef] [Google Scholar] [Publisher Link]
[7] S.N. Rzhevkin, “A Course of Lectures on the Theory of Sound,” Moscow University, Moscow, 1960.
[Google Scholar]
[8] V. P. Maiboroda et al., “Wave Attenuation in an Elastic Medium,” Journal of Soviet Mathematics, vol. 60, no. 2, pр. 1379–1382, 1992.
[CrossRef] [Google Scholar] [Publisher Link]
[9] V.P. Maiboroda, I.I. Safarov, and I.E. Troyanovskii, “Free and Forced Oscillations of a System of Rigid Bodies on Inhomogeneous Viscoelastic Snobbery,” Soviet Machine Science, vol. 3, pp. 25–31, 1983.
[Google Scholar]
[10] Muhsin Kh. Teshaev, Ismail I. Safarov, and Mirziyod Mirsaidov, “Oscillations of Multilayer Viscoelastic Composite Toroidal Pipes,” Journal of the Serbian Society for Computational Mechanics, vol. 13, no. 2, pp. 104-115, 2019.
[CrossRef] [Google Scholar] [Publisher Link]
[11] Deepak Ranjan Biswal, Alok Ranjan Biswal, and Rashmi Ranjan Senapati, "Finite Element Based Vibration Analysis of an Axially Functionally Graded Nonprismatic Beam," SSRG International Journal of Mechanical Engineering, vol. 5, no. 1, pp. 8-13, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
[12] Mirziyod Mirsaidov et al., “Spread Waves in a Viscoelastic Cylindrical Body of a Sector Cross Section with Cutouts,” IOP Conference Series: Materials Science and Engineering, vol. 869, no. 4, p. 042011, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[13] M.M. Mirsaidov et al., “Dynamics of Structural - Inhomogeneous Coaxial-Multi-Layered Systems Cylinder-Shells,” Journal of Physics: Conference Series, vol. 1706, no. 1, p. 012033, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[14] V.T. Grinchenko, and V.V. Meleshko, Harmonic Oscillations and Waves in Elastic Bodies, Nauk, Dumka, Kiev, 1981.
[Google Scholar]
[15] I.I. Safarov et al., “Torsional Vibrations of a Cylindrical Shell in a Linear Viscoelastic Medium,” IOP Conference Series: Materials Science and Engineering, vol. 883, no. 1, p. 012190, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[16] Muhsin Khudoyberdiyevich Teshaev et al., “On the Distribution of Free Waves on the Surface of a Viscoelastic Cylindrical Cavity,” Journal of Vibrational Engineering and Technologies, vol. 8, no. 4, pp. 579-585, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[17] I. I. Safarov et al., “Propagation of Proper Waves in a Viscoelastic Timoshenko Plate of Variable Thickness,” International Journal of Engineering Trends and Technology, vol. 71, no. 1, pp. 25–30, 2023.
[CrossRef] [Publisher Link]
[18] Muhsin Teshaev et al., “Propagation of Natural Waves in Extended Viscoelastic Plates of Variable Thickness," AIP Conference Proceedings, vol. 2647, p. 030002, 2022.
[CrossRef] [Google Scholar] [Publisher Link]
[19] I.A. Viktorov, Physical Basis for the Use of Ultrasonic Rayleigh and Lamb Waves in Technology, Nauka, Moscow, 1966.
[20] I.I. Safarov et al., “Seismic Vibrations of Complex Relief of the Surface of the Naryn Canyon (On the Norin River in Kyrgyzstan) during Large-Scale Underground Explosions,” Journal of Physics: Conference Series, vol. 1706, no. 1, p. 012125, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[21] Hassan Amin Osseily, Hussein El Husseiny, Hilal Sweidan, "Design and Implementation of Frequency Generator of a Portable Sound Wave Fire Extinguisher," SSRG International Journal of Electronics and Communication Engineering, vol. 7, no. 12, pp. 11-21, 2020.
[CrossRef] [Publisher Link]
[22] L.F. Lependin, Acoustics, Higher School, Moscow, 1978.
[23] I.I. Safarov, Z. Boltaev, and T. Razokov, “Natural Vibrations of Spherical Inhomogeneity in a Viscoelastic Medium,” International Journal of Scientific and Technology Research, vol. 9, no. 1, pp. 3674-3680, 2020.
[Google Scholar] [Publisher Link]
[24] I.I. Safarov et al., “Propagation of Own Non Axisymmetric Waves in Viscoelastic Three-Layered Cylindrical Shells,” Engineering Journal, vol. 25, no. 7, pp. 97-107. 2021. [CrossRef] [Google Scholar] [Publisher Link]
[25] L.A Alexeyeva, "Biquaternionic Representation of Harmonic Elementary Particles, Periodic System of Atoms," SSRG International Journal of Applied Physics, vol. 6, no. 3, pp. 74-80, 2019.
[CrossRef] [Google Scholar] [Publisher Link]
[26] V.V. Krylov, Fundamentals of the Theory of Radiation and Scattering of Sound, Moscow State University, Moscow, 1989.
[27] Mirziyod Mirsaidov, Ismoil Safarov, and Mukhsin Teshaev, “Dynamic Instability of Vibrations of Thin-Wall Composite Curvorine Viscoelastic Tubes Under the Influence of Pulse Pressure,” E3S Web of Conferences, vol. 164, p. 14013, pp. 1-12, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[28] I.I. Safarov, M. Teshaev, and Z. Boltaev, “Propagation of Linear Waves in Multilayered Structural – In Homogeneous Cylindrical Shells,” Journal of Critical Reviews, vol. 7, no. 12, pp. 893-904, 2020.
[Google Scholar] [Publisher Link]