Bending of a beam of infinite length in an elastic half-space under the conditions of the three-dimensional problem

Three-dimensional wave propagation in an elastic half space is considered. The half space is traction free on half its boundary, while the remaining part of the boundary is free of shear traction and is constrained against normal displacement by a smooth, rigid barrier. A time-harmonic surface wave, traveling on the traction free part of the surface, is obliquely incident on the edge of the barrier. The amplitude and the phase of the resulting reflected surface wave are determined by means of Laplace transform methods and the Wiener-Hopf technique. Wave propagation in an elastic half space in contact with two rigid, smooth barriers is then considered. The barriers are arranged so that a strip on the surface of uniform width is traction free, which forms a wave guide for surface waves. Results of the surface wave reflection problem are then used to geometrically construct dispersion relations for the propagation of unattenuated guided surface waves in the guiding structure. The rate of decay of body wave disturbances, localized near the edges of the guide, is discussed.

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Analytical and numerical methods of solution of three-dimensional problem of elasticity for functionally graded coated half-space

International Journal of Mechanical Sciences ◽

10.1016/j.ijmecsci.2011.10.001 ◽

2012 ◽

Vol 54 (1) ◽

pp. 105-112 ◽

Cited By ~ 9

Author(s):

Roman Kulchytsky-Zhyhailo ◽

Adam Bajkowski

Keyword(s):

Numerical Methods ◽

Half Space ◽

Three Dimensional ◽

Functionally Graded ◽

Dimensional Problem

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Contact Stress Analysis of a Layered Transversely Isotropic Half-Space

Journal of Tribology ◽

10.1115/1.2920881 ◽

1992 ◽

Vol 114 (2) ◽

pp. 253-261 ◽

Cited By ~ 54

Author(s):

C. H. Kuo ◽

L. M. Keer

Keyword(s):

Half Space ◽

Mixed Boundary ◽

Contact Region ◽

Three Dimensional ◽

Transversely Isotropic ◽

Hankel Transform ◽

Elastic Half Space ◽

Contact Stresses ◽

Stress Components ◽

Contact Failure

The three-dimensional problem of contact between a spherical indenter and a multi-layered structure bonded to an elastic half-space is investigated. The layers and half-space are assumed to be composed of transversely isotropic materials. By the use of Hankel transforms, the mixed boundary value problem is reduced to an integral equation, which is solved numerically to determine the contact stresses and contact region. The interior displacement and stress fields in both the layer and half-space can be calculated from the inverse Hankel transform used with the solved contact stresses prescribed over the contact region. The stress components, which may be related to the contact failure of coatings, are discussed for various coating thicknesses.

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Transient Thermoelastic Stress Fields in a Half-Space

Journal of Tribology ◽

10.1115/1.1501087 ◽

2002 ◽

Vol 125 (1) ◽

pp. 33-43 ◽

Cited By ~ 36

Author(s):

Shuangbiao Liu ◽

Qian Wang

Keyword(s):

Stress Field ◽

Half Space ◽

Frictional Heating ◽

Three Dimensional ◽

Thermoelastic Stress ◽

Parabolic Type ◽

Elastic Half Space ◽

Transform Method ◽

Rough Surface Contact ◽

Thermoelastic Stress Field

Computing the thermoelastic stress field of a material subjected to frictional heating is essential for component failure prevention and life prediction. However, the analysis for three-dimensional thermoelastic stress field for tribological problems is not well developed. Furthermore, the pressure distribution due to rough surface contact is irregular; hence the frictional heating can hardly be described by an analytical expression. This paper presents a novel set of frequency-domain expressions (frequency response functions) of the thermoelastic stress field of a uniformly moving three-dimensional elastic half-space subjected to arbitrary transient frictional heating, where the velocity of the half-space, its magnitude and direction, can be an arbitrary function of time. General formulas are expressed in the form of time integrals, and important expressions for constant velocities are given for the transient-instantaneous, transient-continuous, and steady-state cases. The thermoelastic stress field inside a translating half-space with constant velocities are illustrated and discussed by using the discrete convolution and fast Fourier transform method when a parabolic type or an irregularly distributed heat source is applied.

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The Transition Matrix Formalism for the Scattering of an Alluvium on an Elastic Half-Space

Volume 8: Seismic Engineering ◽

10.1115/pvp2007-26116 ◽

2007 ◽

Author(s):

Wen-I Liao ◽

Tsung-Jen Teng ◽

Shiang-Jung Wang

Keyword(s):

Half Space ◽

Transition Matrix ◽

Plane Waves ◽

Three Dimensional ◽

Scattering Matrix ◽

Elastic Half Space ◽

Basis Functions ◽

Matrix Formalism ◽

T Matrix ◽

Singular Wave

This paper develops the transition matrix formalism for scattering from an three-dimensional alluvium on an elastic half-space. Betti’s third identity is employed to establish orthogonality conditions among basis functions that are Lamb’s singular wave functions. The total displacements and associated tractions exterior and interior to the surface are expanded in a Rayleigh series. The boundary conditions are applied and the T-matrix is derived. A linear transformation is utilized to construct a set of orthogonal basis functions. The transformed T-matrix is related to the scattering matrix and it is shown that the scattering matrix is symmetric and unitary and that the T-matrix is symmetric. Typical numerical results obtained by incident plane waves for verification are presented.

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Viscous-Elastic Half-Space Vibration Stimulated by High-Speed Moving Loads of Different Speeds

Advanced Materials Research ◽

10.4028/www.scientific.net/amr.518-523.3874 ◽

2012 ◽

Vol 518-523 ◽

pp. 3874-3877

Author(s):

Tao Qian ◽

Xiao Ping Shui ◽

Yong Fa Zhang ◽

Yong Gang Guo ◽

Meng Ma

Keyword(s):

Half Space ◽

Coordinate Transformation ◽

High Speed ◽

Three Dimensional ◽

Elastic Half Space ◽

Moving Loads ◽

Cylindrical Coordinates ◽

Relative Coordinate ◽

The Laplace Transform ◽

Practical Security

A rule of response of an infinite viscous-elastic half-space stimulated by the moving loads of different speeds is outlined in this paper. In order to obtain a three-dimensional analytical solution of the Viscous-elastic half-space with the moving loads of different speeds, the Laplace transform and relative coordinate transformation in cylindrical coordinates are used. Then, the IFFT and relative coordinate transformation are used to solve two-dimensional infinite integration which can greatly improve the operational efficiency. The rules of responses of different velocities from the results by using the principle of dynamics and energy dissipation are also analyzed and induced in this paper, and obtain the incentives of displacement distortion by the super-Rayleigh wave velocity at surface. The results could be referred in improving the practical security in the project.

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THREE-DIMENSIONAL SURFACE CRACK ANALYSIS OF ELASTIC HALF-SPACE UNDER ROLLING CONTACT LOAD

International Journal of Computational Methods ◽

10.1142/s021987620900184x ◽

2009 ◽

Vol 06 (02) ◽

pp. 317-332 ◽

Cited By ~ 2

Author(s):

MENG-CHENG CHEN ◽

HUI-QIN YU

Keyword(s):

Numerical Solution ◽

Integral Equations ◽

Half Space ◽

Three Dimensional ◽

Elastic Half Space ◽

Rolling Contact ◽

Contact Load ◽

Hypersingular Integral ◽

Space Body ◽

Planar Crack

In this work a three-dimensional planar crack on the surface of elastic half-space was analyzed under rolling contact load. The stresses interior to an elastic half-space body under rolling contact load and those produced by an infinitesimal displacement jump loop for the elastic half-space body were used to reduce the planar crack problem to the solution of a system of two-dimensional hypersingular integral equations with unknown displacement jump. The ideas of finite element discretization were employed to construct numerical solution schemes for solving the integral equations. An appropriate treatment of the associated hypersingular integral in the numerical solution to the integral equations was proposed in Hadamard's finite-part integral sense. The numerical results showed that the present procedure yields solutions with high accuracies. The stress intensity factors near the crack front edge under rolling contact load were indicated in graphical form with varying the crack shape, the radius of rolling contact zone and the friction coefficients, respectively. In addition, the influence of the lubricant infiltrating the crack surfaces on the crack propagation was also discussed in the paper.

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The Effect of an Axial Force on the Response of an Anisotropic Elastic Half Space to a Rolling Cylinder

Journal of Applied Mechanics ◽

10.1115/1.3422935 ◽

1973 ◽

Vol 40 (1) ◽

pp. 251-256 ◽

Cited By ~ 2

Author(s):

D. L. Clements

Keyword(s):

Half Space ◽

Axial Force ◽

Elastic Half Space ◽

Applied Force ◽

Finite Width ◽

Infinite Length ◽

Anisotropic Elastic

The problem of an inflated cylindrical tire of infinite length and constant finite width steadily rolling over the surface of an anisotropic elastic half space is examined. The influence of an applied force, acting along the axis of the cylinder, on the width of the region of slip at each end of the tire is determined. In particular, it is shown numerically that when a material exhibits certain anisotropy the presence of an axial force can considerably reduce the width of the zones of slip.

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In-Plane Loading in an Elastic Matrix Containing Two Cylindrical Inclusions

Journal of Composite Materials ◽

10.1177/002199836700100408 ◽

1967 ◽

Vol 1 (4) ◽

pp. 404-412 ◽

Cited By ~ 10

Author(s):

James G. Goree

Keyword(s):

Three Dimensional ◽

Numerical Results ◽

Elastic Matrix ◽

Infinite Length ◽

Dimensional Problem ◽

Rigid Spheres ◽

The Matrix ◽

Cylindrical Inclusions

A solution is presented for the stresses and displacements in an infinite elastic matrix containing two perfectly bonded rigid circular cylindrical inclusions of different radii, and of infinite length normal to the x-y plane. The matrix is subjected to in-plane stresses Sx and Sy at infinity as well as loading due to radial expan sion of the inclusions. Numerical results are presented and a com parison is made with the associated three dimensional problem of unequal rigid spheres.

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