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This article is cited in 1 scientific paper (total in 1 paper)
Scientific Part
Mechanics
Contact problem for functionally graded orthotropic strip
A. O. Vatulyana, D. K. Plotnikovb a Southern Federal University, Institute of Mathematics, Mechanics and Computer Sciences named after I. I. Vorovich, 8-A Milchakova St., Rostov-on-Don 344090, Russia
b Southern Mathematical Institute, Vladikavkaz Scientific Center of the Russian Academy of Sciences, 53 Vatutina St., Vladikavkaz 362025, Russia
Abstract:
Within the framework of plane elasticity, the equilibrium problem for an inhomogeneous orthotropic elastic strip under the action of a stamp with a smooth base is investigated. Based on the Fourier transform, a canonical system of differential equations with variable coefficients with respect to transformants of the displacement vector and stress tensor components is constructed. A connection between the vertical displacement and the normal boundary stress is constructed, with which an integral equation of the first kind with a difference kernel is formulated. Using the shooting method, the kernel symbol for the integral equation of the contact problem is constructed numerically. Based on the Vishik – Lyusternik method, an asymptotic analysis of the kernel symbol for large values of the transformation parameter is carried out. A computational scheme for solving an integral equation with an unknown contact area is constructed. The solution of the contact problem for different laws of strip inhomogeneity is presented.
Key words:
contact problem, functionally graded strip, orthotropic material, asymptotic analysis, boundary element method.
Received: 06.06.2022 Revised: 05.08.2022
Citation:
A. O. Vatulyan, D. K. Plotnikov, “Contact problem for functionally graded orthotropic strip”, Izv. Saratov Univ. Math. Mech. Inform., 22:4 (2022), 479–493
Linking options:
https://www.mathnet.ru/eng/isu958 https://www.mathnet.ru/eng/isu/v22/i4/p479
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