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C. S. Jog

doi:10.1017/CBO9781316134030.017

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Published online by Cambridge University Press: 05 May 2015

C. S. Jog

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C. S. Jog: Affiliation:
Indian Institute of Science, Bangalore

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Type: Chapter
Information: Fluid Mechanics
Foundations and Applications of Mechanics
, pp. 543 - 549

DOI: https://doi.org/10.1017/CBO9781316134030.017 [Opens in a new window]

Publisher: Cambridge University Press

Print publication year: 2015

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References

[1] Ackerberg R., C., The viscous incompressible flow inside a cone, J. Fluid Mech., 21(1), 47–81, 1965.CrossRef Google Scholar

[2] Agrawal,, H. L., A new exact solution of the equations of viscous motion with axial symmetry, Quart. J. Mech. Appl. Math., 10(1), 42–44, 1957.CrossRef Google Scholar

[3] Anderson, J. D., Modern Compressible Flow, with Historical Perspective, New York: Mc Graw-Hill, 1990.Google Scholar

[4] Ballal, B. and R. S., Rivlin, Flow of a Newtonian fluid between eccentric rotating cylinders: inertial effects, Arch. Rational Mech. Anal., 62(3), 237–294, 1977.Google Scholar

[5] Badr, O. E., M. N., Farah and A. E., Badran, A study of laminar motion of a viscous incompressible fluid between two parallel eccentric cylinders, Mech. Res. Comm., 19(1), 45–49, 1992.CrossRef Google Scholar

[6] Barakat, R., Propagation of acoustic pulses from a circular cylinder, Acoust. Soc. Am., 33(12), 1759–1764, 1961.

[7] Batchelor, G. K., An Introduction to Fluid Dynamics, Cambridge: Cambridge University Press, 1967.Google Scholar

[8] Bennett, A., Lagrangian Fluid Dynamics, Cambridge: Cambridge University Press, 2006.CrossRef Google Scholar

[9] Berker, R., A new solution of the Navier–Stokes equation for the motion of a fluid contained between two parallel plates rotating about the same axis, Arch. Mech. Stosowan., 31(2), 265–280, 1979.Google Scholar

[10] Brennen, C. E., Cavitation and Bubble Dynamics, New York: Oxford University Press, 1995.Google Scholar

[11] Chadwick, P., Continuum Mechanics, New York: Dover Publications, 1976.Google Scholar

[12] Chan, C. C. C., J. A. W., Elliott and M. C., Williams, Investigation of the dependence of inferred interfacial tension on rotation rate in a spinning drop tensiometer, J. Colloid Interface Sci, 260(1), 211–218, 2003.CrossRef Google Scholar

[13] Chwang, A. T. and T. Y., Wu, Hydromechanics of low-Reynolds-number flow. Part 2. Singularity method for Stokes flows, J. Fluid Mech, 67(04), 787–815, 1975.CrossRef Google Scholar

[14] Cochran, W. G., The flow due to a rotating disc, Proc. Camb. Phil. Soc., 30(03), 178–191, 1934.CrossRef Google Scholar

[15] Coleman, B. D. and W., Noll, The thermodynamics of elastic materials with heat conduction and viscosity, Arch. Rational Mech. Anal., 13(1), 245–261, 1963.CrossRef Google Scholar

[16] Coleman, B. D. and V. J., Mizel, Existence of caloric equations of state in thermodynamics, J. Chem. Phys, 40(4), 1116–1125, 1964.CrossRef Google Scholar

[17] Deo, S. and A., Tiwari, On the solution of a partial differential equation representing irrotational flow in bispherical polar coordinates, Appl. Math. Computation, 205(1), 475–477, 2008.CrossRef Google Scholar

[18] Darwin, C., Note on hydrodynamics, Math. Proc. Camb.Phil. Soc., 49(02), 342–354, 1953.CrossRef Google Scholar

[19] DiPrima, R. C. and J. T., Stuart, Flow between eccentric rotating cylinders, ASME J. Tribology, 94(3), 266–274, 1972.Google Scholar

[20] Dorrepaal J., M., M. E., O'Neill and K. B., Ranger, Axisymmetric Stokes flow past a spherical cap, J. Fluid Mech., 75(02), 273–286, 1976.CrossRef Google Scholar

[21] Edwardes, D., Steady motion of a viscous liquid in which an ellipsoid is constrained to rotate about a principla axis, Quart. J. Math., 26, 70–78, 1892.Google Scholar

[22] El-Saden M., R., Heat conduction in an eccentrically hollow, infinitely long cylinder with internal heat generation, Trans. AMSE, J. Heat Transfer, 83(4), 510–512, 1961.Google Scholar

[23] Erdelyi, A., et al. (Eds.) Tables of Integral Transforms, Vol. I, New York: McGraw-Hill, 1954.

[24] Erdogan, M. E., C. E., Imrak, On the comparison of the solutions obtained by two different transform methods for the second problem of Stokes for Newtonian fluid, Int. J. Non-linear Mech., 44(1), 27–30, 2009.CrossRef Google Scholar

[25] Erdogan, M. E., Unsteady viscous flow between eccentric rotating disks, Int. J. of Non-linear Mech., 30(5), 711–717, 1995.CrossRef Google Scholar

[26] Erdogan, M. E., Flow due to parallel disks rotating about non-coincident axis with one of them oscillating in its plane, Int. J. of Non-linear Mech., 34(6), 1019–1030, 1999.Google Scholar

[27] Fan, C. and B. T., Chao, Unsteady, laminar, incompressible flow through rectangular ducts, Zeitschrift fr Angewandte Mathematik und Physik, 16(3), 351–360, 1965.Google Scholar

[28] Fetecau, C., D., Vieru and C., Fetecau, A note on the second problem of Stokes for Newtonian fluid, Int. J. of Non-linear Mech., 43(5), 451–457, 2008.CrossRef Google Scholar

[29] Filon, L. N. N., The forces on a cylinder in a stream of viscous fluid, Proc. R. Soc. Lond. Ser. A, 113(763), 7–27, 1926.CrossRef Google Scholar

[30] Goldstein, S., The steady flow of viscous fluid past a fixed spherical obstacle at small Reynolds number, Proc. R. Soc. Lond. Ser. A, 123(791), 225–235, 1929.CrossRef Google Scholar

[31] Goodbody, A. M., Cartesian Tensors with Applications to Mechanics, Fluid Mechanics and Elasticity, New York: Ellis Horwood Limited, 1982.Google Scholar

[32] Greenhill, A. G., Fluid motion between confocal elliptic cylinders and confocal ellipsoids, Quart. J. Math. Oxford Ser., 16, 227–256, 1879.Google Scholar

[33] Greenspan, H. P. and D. S., Butler, On the expansion of a gas into vacuum, J. Fluid Mech., 13(01), 101–119, 1963.Google Scholar

[34] Greenspan, M., Piston radiator: Some extensions of the theory, J. Acoust. Soc. Am., 65(3), 608–621, 1979.CrossRef Google Scholar

[35] Gupta, S., D., Poulikakos and V., Kurtcuoglu, Analytical solution for pulsatile viscous flow in a straight elliptic annulus and application to the motion of the cerebrospinal fluid, Phys. Fluids, 20(9), 093607-1:12, 2008.CrossRef Google Scholar

[36] Guria, M., R. N., Jana and S. K., Ghosh, Unsteady Couette flow in a rotating system, Int. J. Non-linear Mech., 41(6), 838–843, 2006.CrossRef Google Scholar

[37] Gurtin, M. E., An Introduction to Continuum Mechanics, San Diego: Academic Press, 1981.Google Scholar

[38] Hall, O., A. D., Gilbert and C. P., Hills, Converging flow between coaxial cones, Fluid Dyn. Res., 41(1), 1:25, 2009.CrossRef Google Scholar

[39] Hartland, S. and R. W., Hartley, Axisymmetric Fluid-Liquid Interfaces, New York: Elsevier Scientific Pub. Co., 1976.Google Scholar

[40] Hasegawa, T., N., Inoue and K., Matsuzawa, A new rigorous expansion for the velocity potential of a circular piston source, J. Acoust. Soc. Am., 74(3), 1044–1047, 1983.CrossRef Google Scholar

[41] Haslam, M. and M., Zamir, Pulsatile flow in tubes of elliptic cross sections, Ann. of Biomed. Eng., 26(5), 780–787, 1998.CrossRef Google Scholar PubMed

[42] Hay, G. E., The method of images applied to the problem of torsion, Proc. Lond. Math. Soc., s2-45(1), 382–397, 1939.CrossRef Google Scholar

[43] Hepworth, H. K. and W., Rice, Laminar flow between parallel plates with arbitrary time-varying pressure gradient and arbitrary initial velocity, J. Appl. Mech., 34(1), 215–216, 1967.CrossRef Google Scholar

[44] Heyda, J. F., A Green's function solution for the case of laminar incompressible flow between non-concentric circular cylinders, J. Franklin Inst., 267(1), 25–34, 1959.CrossRef Google Scholar

[45] Hill, J. M. and J. N., Dewynne, Heat Conduction, Boston: Blackwell Scientific Publications, 1987.Google Scholar

[46] Hunter, S. C., Mechanics of Continuous Media, Chichester: Ellis Horwood Limited, 1983.

[47] Jeffery, G. B., Steady rotation of a solid of revolution in a viscous fluid, Proc. Lond. Math. Soc., 14, 327–338, 1915.Google Scholar

[48] Jeffery, G. B., The rotation of two cylinders in a viscous flow, Proc. of the Royal Society of London. Series A, 101(709), 169–174, 1922.CrossRef Google Scholar

[49] Jog, C. S. and Rakesh, Kumar, Shortcomings of discontinuous-pressure finite element methods on a class of transient problems, Int. J. Numer. Meth. Fluids, 62(3), 313–326, 2010.Google Scholar

[50] Jog, C. S., A finite element method for compressible flow, Int. J. Numer. Meth. Fluids, 66(7), 852–874, 2011.CrossRef Google Scholar

[51] Jog, C. S., An outward-wave-favoring finite element based strategy for exterior acoustic problems, Int. J. Acoustics Vibration, 18(1), 27–38, 2013.CrossRef Google Scholar

[52] Jog, C. S. and A., Nandy, Conservation properties of the trapezoidal rule in linear time domain analysis of acoustics and structures, ASME J. Vibration Acoustics, 137(2), 021010, 2015.CrossRef Google Scholar

[53] Kanwal, R. P., Slow steady rotation of axially symmetric bodies in a viscous fluid, J. Fluid Mech., 10(01), 17–24, 1961.CrossRef Google Scholar

[54] Khamrui, S. R., On the flow of a viscous fluid through a tube of elliptic section under the influence of a periodic pressure gradient, Bull. Calcutta Math. Soc., 49, 57–60, 1957.Google Scholar

[55] Khuri, S. A. and A. M., Wazwaz, The solution of a partial differential equation arising in fluid flow theory, Appl. Maths Computation, 77(2–3), 295–300, 1996.Google Scholar

[56] Khuri, S. A. and A. M., Wazwaz, On the solution of a partial differential equation arising in Stokes flow, Appl. Maths Computation, 85(2–3), 139–147, 1997.Google Scholar

[57] Joseph, D. D., Potential flow of viscous fluids: Historical notes, Int. J. Multiphase Flow, 32(3), 285–310, 2006.CrossRef Google Scholar

[58] Lai, C.-Y., K. R., Rajagopal and A. Z., Szeri, Asymmetric flow between parallel rotating disks, J. Fluid Mech., 146, 203–225, 1984.CrossRef Google Scholar

[59] Lai, C.-Y., K. R., Rajagopal and A. Z., Szeri, Asymmetric flow above a rotating disk, J. Fluid Mech., 157, 471–492, 1985.CrossRef Google Scholar

[60] Lamb, H., Hydrodynamics, New York: Dover Publications, 1945.Google Scholar

[61] Mallick, D. D., Nonuniform rotation of an infinite circular cylinder in an infinite viscous liquid, ZAMM, 37(9/10), 385–392, 1957.CrossRef Google Scholar

[62] Malvern, L. E., Introduction to the Mechanics of a Continuous Medium, New Jersey: Prentice Hall Inc., 1969.Google Scholar

[63] Marsden, J. E. and Hughes, T. J. R., Mathematical Foundations of Elasticity, New York: Dover Publications, 1983.Google Scholar

[64] Mast, T. D. and Y., Feng, Simplified expansions for radiation from a baffled circular piston, J. Acoust. Soc. Am., 118(6), 3457–3464, 2005.Google Scholar

[65] MATLAB User's Guide, Natick, Massachusetts: The Math Works Inc., 2011.

[66] Matunobu, Y., Pressure flow relationships for steady flow through an eccentric double circular tube, Fluid Dynamics Res., 4(2), 139–149, 1988.CrossRef Google Scholar

[67] Moody D., M., Unsteady expansion of an ideal gas into a vacuum, J. Fluid Mech., 214, 455–468, 1990.CrossRef Google Scholar

[68] Morton W., B., On the displacements of the particles and their paths in some cases of two-dimensional motion of a frictionless liquid, Proc. R. Soc. Lond. Ser. A, 89(608), 106–124, 1913.CrossRef Google Scholar

[69] Muhammad, G., N. A., Shah and M., Mushtaq, Indirect boundary element method for calculation of potential flow around a prolate spheroid, J. Am. Sci., 6(1), 148–156, 2010.Google Scholar

[70] Mellor, G. L., P. J., Chapple and V. K., Stokes, On the flow between a rotating and a stationary disk, J. Fluid Mech., 31(1), 95–112, 1968.CrossRef Google Scholar

[71] Miksis, M., J. M., Vanden-Broeck and J. B., Keller, Axisymmetric bubble or drop in a uniform flow, J. Fluid Mech., 108, 89–100, 1981.CrossRef Google Scholar

[72] Noll, W., A mathematical theory ofthe mechanical behavior ofcontinuous media, Arch. Rational Mech. Anal. 2(1), 197–226, 1958. Reprinted in Noll, W.The foundations of mechanics and thermodynamics, Berlin: Springer-Verlag, 1974.Google Scholar

[73] Oberhettinger, F., On transient solutions of the ‘baffled piston’ problem, J. Res. Natl. Bur. Stand., 65B(1), 1–6, 1961.Google Scholar

[74] Ozisik, M. N., Heat Conduction, New York: John Wiley, 1993.Google Scholar

[75] Padmavathi, B. S., G. P., Rajashekhar and T., Amarnath, A note on complete general solutions of Stokes equations, Quart. J. Mech. Appl. Math., 51(3), 383–388, 1998.Google Scholar

[76] Palaniappan, D., S. D., Nigam, T., Amarnath and R., Usha, Lamb's solution of Stokes's equations: A sphere theorem, Quart. J. Mech. Appl. Math., 45(1), 47–56, 1992.CrossRef Google Scholar

[77] Parter, S. V. and K. R., Rajagopal, Swirling flow between rotating plates, Arch. Rational Mech. Anal., 86(4), 305–315, 1984.CrossRef Google Scholar

[78] Payne, L. E., On axially symmetric flow and the method of generalized electrostatics, Quart. Appl. Math., 10(3), 197–204, 1952.CrossRef Google Scholar

[79] Payne, L. E. and W. H., Pell, The Stokes flow problem for a class of axially symmetric bodies, J. Fluid Mech., 7(04), 529–549, 1960.CrossRef Google Scholar

[80] Phan-Thien, N. and R. I., Tanner, Viscoelastic squeeze-film flows-Maxwell fluids, J. Fluid Mech., 129, 265–281, 1983.CrossRef Google Scholar

[81] Phan-Thien, N. and W., Walsh, Squeeze-film flow of an Olroyd-B fluid: Similarity solution and limiting Weissenberg number, J. Appl. Math. Phys. (ZAMP), 35(6), 747–758, 1984.CrossRef Google Scholar

[82] Ponnusamy, S., Foundations of Complex Analysis, Oxford: Alpha Science International Limited, Second Edition, 2006.Google Scholar

[83] Prakash, S., Laminar flow in an annulus with arbitrary time-varying pressure gradient and arbitrary initial velocity, J. Appl. Mech., 36(2), 309–311, 1969.CrossRef Google Scholar

[84] Prakash, S., Note on the problem of unsteady viscous flow past a flat plate, Ind. J. Pure Appl. Math., 2(2), 283–289, 1971.Google Scholar

[85] Princen, H. M., I. Y. Z., Zia and S. G., Mason, Measurement of interfacial tension from the shape of a spinning drop, J. Colloid Interface Sci., 23(1), 99–107, 1967.CrossRef Google Scholar

[86] Proudman, I. and J. R. A., Pearson, Expansions at small Reynolds numbers for the flow past a sphere and a circular cylinder, J. Fluid Mech., 2(03), 237–262, 1957.CrossRef Google Scholar

[87] Saatdjian, E., N., Midoux and J. C., Andre, On the solution of Stokes equations between confocal ellipses, Phys. Fluids, 6(12), 3833–3846, 1994.CrossRef Google Scholar

[88] Schlicting, H., Boundary Layer Theory, New York: McGraw-Hill, 1979.Google Scholar

[89] Sidrak, S., The drag on a circular cylinder in a stream of viscous liquid at small Reynolds numbers, Proc. R. Irish Acad. Sec. A, 53, 17–30, 1950/51.Google Scholar

[90] Silhavy, M., The Mechanics and Thermodynamics of Continuous Media, Berlin: Springer-Verlag, 1997.CrossRef Google Scholar

[91] Snyder W., T., G. A., Goldstein, An analysis of fully developed laminar flow in an eccentric annulus, Report No. 8, State Univ. New York, 1–18, 1963.Google Scholar

[92] Sparrow, E. M., Laminar flow in isosceles triangular ducts, AIChE Journal, 8(5), 599–604, 1962.CrossRef Google Scholar

[93] Stoker, J. J., Water Waves, New York: Interscience Publishers, 1957.Google Scholar

[94] Straughan, B., Heat waves, New York: Springer, 2011.CrossRef Google Scholar

[95] Tachibana, M. and Y., Iemoto, Steady flow around, and drag on a circular cylinder moving at low speeds in a viscous liquid between two parallel planes, Fluid Dyn. Res., 2(2), 125–137, 1987.CrossRef Google Scholar

[96] Tomotika, S., T., Aoi, The steady flow of a viscous fluid past an elliptic cylinder and a flat plate at small Reynolds numbers, Quart. J. Mech. Appl. Math., 6(3), 290–312, 1953.CrossRef Google Scholar

[97] Truesdell, C., Rational Thermodynamics, New York: Springer-Verlag, 1984.CrossRef Google Scholar

[98] Van Dyke, M.Perturbation Methods in Fluid Dynamics, New York: Academic Press, 1964.Google Scholar

[99] Venkatlaxmi, A., B. S., Padmavathi and T., Amarnath, Unsteady Stokes equations: Some complete general solutions, Proc. Ind. Acad. Sci. (Math. Sci.), 114(2), 203–213, 2003.Google Scholar

[100] Verma, P. D., The pulsating viscous flow superposed on the steady laminar motion of incompressible fluid between two co-axial cylinders, Proc. Ind. Acad. Sci. Math., 26(5), 447–458, 1960.Google Scholar

[101] Verma, P. D., The pulsating viscous flow superposed on the steady laminar motion of incompressible fluid in a tube of elliptic cross section, Proc. Indian Acad. Sci. Math., 26(3), 282–297, 1960.Google Scholar

[102] Vonnegut, B., Rotating bubble method for the determination of surface and interfacial tension, Rev. Sci. Instr., 13(1), 6–9, 1942.CrossRef Google Scholar

[103] Wannier, G. H., A contribution to the hydrodynamics of lubrication, Quart. Appl. Math., 8, 1–32, 1950.CrossRef Google Scholar

[104] Wang, C. Y., Exact solutions of the unsteady Navier–Stokes equations, Appl. Mech. Rev., 42(11), S269–S282, 1989.CrossRef Google Scholar

[105] White, F. M., Fluid Mechanics, New York: McGraw-Hill International Edition, 1994.Google Scholar

[106] White, F. M., Viscous Fluid Flow, New York: McGraw-Hill, 1991.Google Scholar

[107] Wolfram, S., Mathematica, Champaign, Illinois: Wolfram Research Inc., 2014.

[108] Yakubovich, E. I. and D. A., Zenkovich, Matrix approach to Lagrangian fluid dynamics, J. Fluid Mech., 443, 167–196, 2001.CrossRef Google Scholar

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