Main Catalog Mathematics and Mechanics Differential Equations and Mathematical Physics

Describing Non-Axisymmetric Elastic Fields Generated by Volume Forces in Anisotropic Solids of Revolution

Authors: Ivanychev D.A., Levina E.Yu.	Published: 09.08.2022
Published in issue: #4(103)/2022
DOI: 10.18698/1812-3368-2022-4-22-38
Category: Mathematics and Mechanics \| Chapter: Differential Equations and Mathematical Physics
Keywords: non-axisymmetric deformation, boundary state method, elastic stress state, volume forces, transversely isotropic bodies, state space

Abstract

The paper presents a technique for plotting elastic fields in transversely isotropic bodies bounded by coaxial surfaces of revolution, subjected to non-axisymmetric volume forces. Our theory uses the ideas of the boundary state method, which is based on state spaces describing a medium. Fundamental polynomials form the basis of the internal state space. A polynomial is placed in any displacement vector position in a planar auxiliary state, then transition formulas can be used to determine the spatial state. A set of such states forms a finite-dimensional basis that is used after orthogonalisation to expand the desired elastic field characteristics into Fourier series with identical coefficients. These series coefficients are dot products of given and base volume force vectors. The search for an elastic state is reduced to solving quadratures. We provide guidelines for constructing an internal state basis depending on the type of volume forces given by various cyclic functions (sine and cosine). We analysed a solution to a specific theory of elasticity problem concerning a transversely isotropic circular cylinder subjected to non-axisymmetric volume forces. We analysed the series convergence and graphically evaluated the solution accuracy

Please cite this article in English as:

Ivanychev D.A., Levina E.Yu. Describing non-axisymmetric elastic fields generated by volume forces in anisotropic solids of revolution. Herald of the Bauman Moscow State Technical University, Series Natural Sciences, 2022, no. 4 (103), pp. 22--38 (in Russ.). DOI: https://doi.org/10.18698/1812-3368-2022-4-22-38

References

[1] Vestyak V.A., Tarlakovskii D.V. Unsteady axisymmetric deformation of an elastic thick-walled sphere under the action of volume forces. J. Appl. Mech. Tech. Phy., 2015, vol. 56, no. 6, pp. 984--994. DOI: https://doi.org/10.1134/S0021894415060085

[2] Fukalov A.A. [Problems on elastic equilibrium of composite thick-walled transversally isotropic spheres under influence of mass forces and internal pressure, and their applications]. XI Vseros. s"ezd po fundamental’nym problemam teoreticheskoy i prikladnoy mekhaniki [XI Russ. Congress on Fundamental Problems of Theoretical and Applied Mechanics]. Kazan, KFU Publ., 2015, pp. 3951--3953 (in Russ.).

[3] Zaytsev A.V., Fukalov A.A. Accurate analytical solutions of equilibrium problems for elastic anisotropic bodies with central and axial symmetry located gravitational forces field and their applications to problems of geomechanics. Matematicheskoe modelirovanie v estestvennykh naukakh, 2015, vol. 1, no. 1, pp. 141--144 (in Russ.).

[4] Agakhanov E.K. About development of complex decision methods of the problems of deformable solid body mechanics. Herald of Daghestan State Technical University. Technical Sciences, 2013, vol. 29, no. 2, pp. 39--45 (in Russ.). DOI: https://doi.org/10.21822/2073-6185-2013-29-2-39-45

[5] Sharafutdinov G.Z. Functions of a complex variable in problems in the theory of elasticity with mass forces. J. Appl. Math. Mech., 2009, vol. 73, iss. 1, pp. 48--62. DOI: https://doi.org/10.1016/j.jappmathmech.2009.03.008

[6] Struzhanov V.V., Sagdullaeva D.A. On solution of elasticity theory boundary problems using method of orthogonal projections. Matematicheskoe modelirovanie sistem i protsessov, 2004, no. 12, pp. 89--100 (in Russ.).

[7] Kuz’menko V.I., Kuz’menko N.V., Levina L.V., et al. A method for solving problems of the isotropic elasticity theory with bulk forces in polynomial representation. Mech. Solids., 2019, vol. 54, no. 5, pp. 741--749. DOI: https://doi.org/10.3103/S0025654419050108

[8] Penkov V.B., Levina L.V., Novikova O.S. Analytical solution of elastostatic problems of a simply connected body loaded with nonconservative volume forces: theoretical and algorithmic support. Vestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.], 2020, vol. 24, no. 1, pp. 56--73 (in Russ.). DOI: https://doi.org/10.14498/vsgtu1711

[9] Ivanychev D.A. A method of boundary states in a solution to the first fundamental problem of the theory of anisotropic elasticity with mass forces. Tomsk State University Journal of Mathematics and Mechanics, 2020, no. 66, pp. 96--111 (in Russ.). DOI: https://doi.org/10.17223/19988621/66/8

[10] Ivanychev D.A. The method of boundary states in the solution of the second fundamental problem of the theory of anisotropic elasticity with mass forces. Tomsk State University Journal of Mathematics and Mechanics, 2019, no. 61, pp. 45--60 (in Russ.). DOI: https://doi.org/10.17223/19988621/61/5

[11] Ivanychev D.A. The contact problem solution of the elasticity theory for anisotropic rotation bodies with mass forces. PNRPU Mechanics Bulletin, 2019, no. 2, pp. 49--62 (in Russ.). DOI: https://doi.org/10.15593/perm.mech/2019.2.05

[12] Ivanychev D.A. A boundary state method for solving a mixed problem of the theory of anisotropic elasticity with mass forces. Tomsk State University Journal of Mathematics and Mechanics, 2021, no. 71, pp. 63--77 (in Russ.). DOI: https://doi.org/10.17223/19988621/71/6

[13] Ivanychev D.A., Levina E.Yu. The solution of boundary value problems of various types with consideration of volume forces for anisotropic bodies of revolution. Herald of the Bauman Moscow State Technical University, Series Natural Sciences, 2021, no. 4 (97), pp. 57--70. DOI: https://doi.org/10.18698/1812-3368-2021-4-57-70

[14] Ivanychev D.A., Levina E.Yu. Solution of thermo elasticity problems for solids of revolution with transversal isotropic feature and a body force. J. Phys.: Conf. Ser., 2019, vol. 1348, art. 012058. DOI: https://doi.org/10.1088/1742-6596/1348/1/012058

[15] Aleksandrov A.Ya., Solovyev Yu.I. Prostranstvennye zadachi teorii uprugosti [Spatial problems of elasticity theory]. Moscow, Nauka Publ., 1978.

[16] Lurye A.I. Prostranstvennye zadachi teorii uprugosti [Spatial problems of elasticity theory]. Moscow, GITTL Publ., 1955.

[17] Penkov V.B., Penkov V.V. Boundary conditions method for solving linear mechanics problems. Dal’nevostochnyy matematicheskiy zhurnal [Far Eastern Mathematical Journal], 2001, vol. 2, no. 2, pp. 115--137 (in Russ.).

[18] Satalkina L.V. [Basis expansion of the state space with severe limitations on computations energy consumption]. Sb. tez. dokl. nauch. konf. studentov i aspirantov LGTU [Abs. Sci. Conf. of Students and Postgraduates]. Lipetsk, LSTU Publ., 2007, pp. 130--131 (in Russ.).

[19] Lekhnitskiy S.G. Teoriya uprugosti anizotropnogo tela [Elasticity theory of an anisotropic body]. Moscow, Nauka Publ., 1977.

[20] Levina L.V., Novikova O.S., Penkov V.B. Full parametrical solution of the problem of the elasticity theory of a simply connected finite body. Vestnik LGTU [Vestnik LSTU], 2016, no. 2 (28), pp. 16--24 (in Russ.).