3D dynamic response of a multi-layered transversely isotropic half-space subjected to a moving point load along a horizontal straight line with constant speed

Ba, Zhenning; Liang, Jianwen; Lee, Vincent; Ji, Hang

doi:10.1016/j.ijsolstr.2016.09.016

Cited by 66 publications

(14 citation statements)

References 37 publications

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“…For the second verification, the problem of a load moving on the surface of a homogeneous cross-anisotropic half-space medium is solved by the proposed method and compared with the solution of Ba et al [27]. Thus, assuming the same values with Ba et al [27], i.e., E=5 GPa, =2E, v= =0.25, , =0.3 and =2000 kg/ , one can obtain the normalized vertical displacement = at a depth z=10 m as a function of the normalized load speed = as shown in Fig. 3b.…”

Section: Verification and Convergence Studiesmentioning

confidence: 99%

“…2) Works associated with elastic beams or plates on a homogeneous or layered, isotropic half-space under point or distributed, constant or time harmonic loads moving with constants speed, e.g., [23][24][25][26]. 3) Works associated with or without plates on a homogeneous or layered, transversely isotropic (or cross-anisotropic) elastic half-spaces under point or distributed, constant or time harmonic loads moving with constant speed, e.g., [27][28]. 4) Works associated with homogeneous, transversely isotropic (or cross-anisotropic) elastic half-spaces under dynamic but stationary loads, e.g.…”

Section: Introductionmentioning

confidence: 99%

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Analytical/Numerical Solutions to the Problem of the Dynamic Response of an Elastic Plate on a Continuously Non-Homogeneous Cross-Anisotropic Viscoelastic Soil to a Moving Load

Beskou¹,

Muho²

2021

Proceedings of the 8th International Conference on Computational Methods in Structural Dynamics and Earthquake Engineering (COM

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In this work the problem of the dynamic response of a flexural elastic plate on a continuously nonhomogeneous viscoelastic cross-anisotropic half-plane or half-space soil medium to a line or rectangular load moving with constant speed is determined analytically/numerically. Soil nonhomogeneity is associated with elastic moduli increasing with depth. Plate viscous damping is considered, and the viscoelastic effects of the soil are introduced via hysteric damping. The solution of the problem is obtained with the aid of the complex Fourier series method involving the horizontal coordinates and the time. Employment of this method reduces the partial differential equations of motion for the soil and the plate to ordinary differential equations with variable coefficients and an algebraic equation, respectively. Those ordinary differential equations are solved by the method of Frobenius. Verification of the solutions is done by means of comparisons with known existing analytical solutions for the special cases of isotropy and homogeneity with or without the plate.

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Section: Verification and Convergence Studiesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Analytical/Numerical Solutions to the Problem of the Dynamic Response of an Elastic Plate on a Continuously Non-Homogeneous Cross-Anisotropic Viscoelastic Soil to a Moving Load

Beskou¹,

Muho²

2021

Proceedings of the 8th International Conference on Computational Methods in Structural Dynamics and Earthquake Engineering (COM

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“…Mechanical behaviors of soils under dynamic loads, such as traffic loads, construction operations, machinery vibrations, and earthquakes, are of fundamental importance in pavement engineering, geotechnical, and seismic engineering [1][2][3]. By treating soil materials as single-phase elastic or viscoelastic media, their dynamic responses to external loads have been studied extensively in classical treatments [4][5][6].…”

Section: Introductionmentioning

confidence: 99%

Elastodynamic Solutions of a Finite Soil Layer under Interior Distributed Actions

Zhang

Zhan

2021

Shock and Vibration

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Through a method of displacement potentials, Fourier series, and Hankel integral transformation, the generalized solutions of an elastic layer resting on a rigid base under arbitrary, distributed, buried, and time-harmonic loads are developed in this study. With the proposed solution, the specific results for two kinds of uniform distributions as a kind of fundamental solutions in the interaction analysis of media and inclusions by the method of boundary integral equations are included as illustrations. Finally, numerical examples involving surface and buried patch loads are presented to validate the solutions and examine the effects of the thickness of the elastic layer. The results show that the proposed solution can cover the classical half-space solution by taking enough large thickness of the elastic layer (e.g., the ratio of the layer thickness beneath the load to the load radius ≥ 50 ) and the surface load solution by setting the load depth to zero; the underlying rigid base has significant and complex influence on the dynamic response of the thin layer due to wave reflections, which needs to be considered in the design and practice of related engineering.

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“…Nevertheless, the problem of a dynamic load applied directly to a TI or anisotropic foundation has been extensively investigated in recent years. [36][37][38][39][40][41][42][43][44] The subsoils were modeled as solely one type of TI medium in these works, namely, as a TI elastic or poroelastic half-space. However, the distribution of the groundwater in the foundation is very complicated, which results in the complexities of the water content and saturation of different soils.…”

Section: Introductionmentioning

confidence: 99%

“…Researches on the dynamic response of a beam coupled with a TI half‐space are quite limited according to the above literature review. Nevertheless, the problem of a dynamic load applied directly to a TI or anisotropic foundation has been extensively investigated in recent years 36–44 . The subsoils were modeled as solely one type of TI medium in these works, namely, as a TI elastic or poroelastic half‐space.…”

Section: Introductionmentioning

confidence: 99%

Moving load response of an axially loaded Timoshenko beam on a multilayered transversely isotropic half‐space comprising different media

Feng

Chen

2020

Num Anal Meth Geomechanics

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This paper investigates the dynamic response of an axially loaded Timoshenko beam coupled with a multilayered transversely isotropic (TI) half-space subjected to a moving load. An axial force induced by the thermal expansion is taken into account in the Timoshenko beam. The half-space considers the alternate distribution of an arbitrary number of TI elastic and poroelastic layers to model foundation soils with different properties and moisture conditions. To solve the governing equations, Fourier transform is adopted. The stratified foundation is formulated by extending an "adapted stiffness matrix method" to a more general scenario with an arbitrary number of layers. The beam is then coupled with the foundation to derive solutions to the system in the frequency-wavenumber domain. The final results in the time-spatial domain are recovered by the inverse Fourier transform. After confirming the accuracy of the method in this study, the influences of the pore water existence, the transverse isotropy of different parameters, and the axial force are investigated. It can be observed that the effect of pore water existence on the maximum beam deflection can reach 22% in this study. The transverse isotropy of the elastic and shear moduli influences the critical speed of the beam deflection by altering the phase velocity of the first wave propagation mode of the beam-foundation system. The vertical permeability coefficient is more important than the horizontal one in determining the excess pore pressure. The rise of the beam temperature (axial force) decreases the critical speed and magnifies the vibrations.

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3D dynamic response of a multi-layered transversely isotropic half-space subjected to a moving point load along a horizontal straight line with constant speed

Cited by 66 publications

References 37 publications

Analytical/Numerical Solutions to the Problem of the Dynamic Response of an Elastic Plate on a Continuously Non-Homogeneous Cross-Anisotropic Viscoelastic Soil to a Moving Load

Analytical/Numerical Solutions to the Problem of the Dynamic Response of an Elastic Plate on a Continuously Non-Homogeneous Cross-Anisotropic Viscoelastic Soil to a Moving Load

Elastodynamic Solutions of a Finite Soil Layer under Interior Distributed Actions

Moving load response of an axially loaded Timoshenko beam on a multilayered transversely isotropic half‐space comprising different media

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