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Axi-Symmetric Deformation Due to Various Sources in Saturated Porous Media with Incompressible Fluid | ||
| Journal of Solid Mechanics | ||
| مقاله 7، دوره 5، شماره 1، خرداد 2013، صفحه 74-91 اصل مقاله (351.11 K) | ||
| نوع مقاله: Research Paper | ||
| نویسندگان | ||
| R Kumar* 1؛ S Kumar2؛ M.G Gourla3 | ||
| 1Department of Mathematics, Kurukshetra University | ||
| 2Department of Mathematics, Govt. Degree College Indora (Kangra), Himachal Pradesh | ||
| 3Department of Mathematics, Himachal Pradesh University | ||
| چکیده | ||
| The general solution of equations of saturated porous media with incompressible fluid for two dimensional axi-symmetric problem is obtained in the transformed domain. The Laplace and Hankel transforms have been used to investigate the problem. As an application of the approach concentrated source and source over circular region have been taken to show the utility of the approach. The transformed components of displacement, stress and pore pressure are obtained. Numerical inversion technique is used to obtain the resulting quantities in physical domain. Effect of porosity is shown on the resulting quantities. A particular case of interest is also deduced from the present investigation. | ||
| کلیدواژهها | ||
| Axi-symmetric؛ Incompressible porous medium؛ Pore pressure؛ Laplace transform؛ Hankel transform؛ Concentrated source and source over circular region | ||
| مراجع | ||
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[1] Biot MA., 1956, Theory of propagation of elastic waves in fluid saturated porous solid I-low frequency range, Journal of the Acoustical Society of America 28:168-178.
[2] Prevost JH.,1980, Mechanics of continuous porous media, International journal of Engineering Science 18:787-800.
[3] Zenkiewicz OC., Chang CT., Bettess P., Drained., 1980, Consolidating and dynamic behavior assumptions in soils, Geotechnique 30(4):385-395.
[4] Zenkiewicz OC., Shiomi T., 1984, Dynamic behavior of saturated porous media: the generalized Biot formulation and its numerical solution, International Journal of Numerical and Analytical methods in Geomechanics 8: 71-96.
[5] Gatmiri B., Kamalian M., 2002, On the fundamental solution of dynamic poroelastic boundary integral equations in the time domain, The International Journal of Geomechanics 2(4): 381-398.
[6] Gatmiri B., Nguyen KV., 2005, Time 2D fundamental solution for saturated porous media with incompressible fluid, Communications in Numerical Methods in Engineering 21:119-132.
[7] Gatmiri B., Jabbari M., 2005, Time domain Green’s functions for unsaturated soil, International Journal of Solid and Structure 42:5971-5990.
[8] Gatmiri B., Jabbari M., 2005, Time domain Green’s functions for unsaturated soil, International Journal of Solid and Structure 42:5991-6002.
[9] Gatmiri B., Maghoul P., Duhamel D., 2010, Two-dimensional transient thermo-hydro-mechanical solutions of multiphase porous media in frequency and time domain, International Journal of Solid and Structure 47:595-610.
[10] Gatmiri B., Eslami H., 2007, The scattering of harmonic waves by a circular cavity in a porous medium: complex function theory approach, International Journal of Geomechanics 7(5): 371-381.
[11] Kumar R., Singh R., Chadha TK., 2002, Axisymmetric problem in microstrectch elastic solid, Indian Journal of Mathematics 44:147-164.
[12] Kumar R., Singh R., 2005, Elastodynamics of an axisymmetric problem in microstrectch visco elastic solid, International Journal of Applied Mechanics and Engineering 10:227-244.
[13] Kaushal S., Kumar R., Miglani A., 2010, Response of frequency domain in generalized thermoelasticity with two temperature, Journal of Engineering Physics and Thermophysics 83(5): 1080-1088.
[14] Kumar R., Garg NR., Miglani A., 2003, Elastodynamics of an axisymmetric problem in an anisotropic liquid-saturated porous medium, Journal of Sound and Vibration 261:697-714.
[15] Oliveira MMF., Dumont NA., Selvadura APS., 2012, Boundary element formulation of axisymmetric problems for an elastic halfspace, Engineering Analysis with Boundary Elements, 36(10):1478-1492.
[16] Akbarob SD., Guliev MS., 2010, The influence of the finite initial strain on the axisymmetirc wave dispersion in a circular cylinder embedded in a compressible elastic medium,International Journal of Mechanical Sciences, 52(1): 89-95.
[17] Gordeliy E., Detourna E., 2011, Displacement discontinuity method for modeling axisymmetric cracks in an elastic half-space, International Journal of Solids and Structures, 48(19):2614-2629.
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