Axially Symmetric Vibrations of a Liquid-Filled Poroelastic Thin Cylinder Saturated with Two Immiscible Liquids Surrounded by a Liquid
Subject Areas : EngineeringB Sandhyarani 1 , J Anand Rao 2 , P Malla Reddy 3
1 - Department of Mathematics, Osmania University, Hyderabad, India
2 - Department of Mathematics, Osmania University, Hyderabad, India
3 - Department of Mathematics, Kakatiya University, Warangal, India
Keywords: Thin cylinder, Phase velocity, Axially symmetric vibrations, Wavenumber, Liquid,
Abstract :
This paper studies axially symmetric vibrations of a liquid-filled poroelastic thin cylinder saturated with two immiscible liquids of infinite extent that is surrounded by an inviscid elastic liquid. By considering the stress free boundaries, the frequency equation is obtained. Particular case, namely, liquid-filled poroelastic cylinder saturated with single liquid is discussed. When the wavenumber is large, the frequency equation is reduced to that of Rayleigh-type surface wave at the plane boundary of a poroelastic half-space. In this case, the asymptotic expressions of Bessel functions and modified Bessel functions are used. In both general and particular cases, the case of the propagation of Rayleigh waves in a poroelastic half-space is obtained. The parameter values of Columbia fine sandy loam saturated with air-water mixture are used for the numerical evaluation. In all the cases, phase velocity as a function of wavenumber is computed and presented graphically. From the numerical results, some inferences are drawn.
[1] Biot M.A., 1956, The theory of propagation of elastic waves in a fluid-saturated porous solid, Journal of Acoustical Society of America 28: 158-191.
[2] Tuncay K., Corapcioglu M.Y., 1997, Wave propagation in porous media saturated by two fluids, Journal of Applied Mechanics 64: 313-319.
[3] Tuncay K., Corapcioglu M.Y., 1996, Body waves in poroelastic media saturated by two immiscible fluids, Journal of Geophysical Physical Research 101: 149-159.
[4] Santos J. E., Corbero J., Douglas Jr. J., 1990, Static and dynamic behavior of a porous solid saturated by a two phase fluid, Journal of Acoustical Society of America 87: 1428-1438.
[5] Sahay P.N., Spanos T. J. T., De la C., 2001, Seismic wave propagation in inhomogeneous and anisotropic porous media, Geophysical Research International 145: 209-222.
[6] Hanyga A., 2004, Two fluid porous flow in a single temparature approximation, International Journal of Engineering Science 42: 1521-1545.
[7] Lo W.-Ch., Sposito G., Majer E., 2007, Wave propagation through elastic porous media containing two immiscible fluids, Water Resources Research 41: 1-20.
[8] Lin T.C., 1956, Wave propagation through fluid contained in a cylindrical elastic shell, Journal of Acoustical Society of America 28: 1165-1176.
[9] Ram K., 1971, Flexural vibrations of fluid-filled circular cylindrical shells, Acta Acustica United with Acustica 24: 137-146.
[10] Sharma M. D., Gogna M. L., 1990, Propagation of elastic waves in a cylindrical bore in a liquid saturated porous solid, Geophysical Journal International 103: 47-54.
[11] Thomas J. P., Bikash S., Serio K., Shu-Kong Ch., 1992, Axially symmetric wave propagation in fluid-loaded cylindrical shells: I Theory, Journal of Acoustical Society of America 92: 1144-1155.
[12] Vinay D., 1993, Longitudinal waves in a homogeneous anisotropic cylindrical bars immersed in fluid, Journal of Acoustical Society of America 93: 1249-1255.
[13] Grinchenko V.T., Komissarova G. L., 1994, Axisymmetric waves in a fluid-filled, hollow, elastic cylinder surrounded by a fluid, International Applied Mathematics 30: 657-664.
[14] Vashishth A. K., Khurana P., 2005, Wave propagation along a cylindrical borehole in an anisotropic poroelastic solid, Geophysical Journal International 161: 295-302.
[15] Seyyed M.H., Hosseeini H., 2008, Non axisymmetric interaction of a spherical radiator in a fluid-filled permeable borehole, International Journal of Solids and Structures 45: 24-47.
[16] Ashish A., Tomar S. K., 2007, Elastic waves along a cylindrical borehole in a poroelastic medium saturated by two immiscible fluids, The Journal of Earth System Science 116: 225-234.
[17] Tajudddin M., Buchilingam P., 1990, Propagation of surface waves in a poroelastic solid layer lying over an elastic solid, Acta Geophysica 38: 279-287.
[18] Tajuddin M., 1984, Rayleigh waves in porous elastic saturated solids, Journal of Acoustical Society of America 33: 682-684.
[19] Malla Reddy P., Sandhya Rani B., Tajuddin, M., 2011, Dispersion study of axially symmetric waves in cylindrical bone filled with marrow, International Journal Biomathematics 4: 109-118.
[20] Ahmed Shah S., 2008, Axially symmetric vibrations of fluid-filled poroelastic circular cylindrical shells, Journal of Sound and Vibration 318: 389-405.
[21] Ahmed Shah S., Tajuddin, M., 2010, On flexural vibrations of poroelastic circular cylindrical shells immersed in an acoustic medium, Special Topics and Reviews in Porous media 1: 67-78.
[22] Shanker B., Nath C. N., Shah S. A., Malla Reddy P., 2013, Vibrations in a fluid-loaded poroelastic hollow cylinder surrounded by a fluid in plane-strain form, International Journal of Applied Mechanics and Engineering 18: 189-216.
[23] Shanker B., Nageswara Nath C., Ahmed Shah S., Manoj Kumar J., 2013, Vibration analysis of poroelastic composite hollow sphere, Acta Mechanica 224: 327-341.
[24] Shanker B., Nageswara Nath C., Ahmed Shah S., Manoj Kumar J., 2013, Free vibrations of fluid-loaded poroelastic hollow sphere surrounded by a fluid, International Journal of Applied Mathematics and Mechanics 9: 14-34.
[25] Ramesh M., Ahmed Shah S., Ramana Murthy M.V., 2014, Analysis of radial vibrations of poroelastic circular cylindrical shells immersed in an acoustic medium, International Journal of Engineering Science and Technology 6: 26-35.
[26] Abramowitz M., Stegun I. A., 1965, Hand book of Mathematical Functions, Dover publication, New York.