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On the Motion of a Heterogeneous Liquid, commencing from Rest with a given Motion of its Boundary
Published online by Cambridge University Press: 15 September 2014
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I use the word “liquid” for brevity to denote an incompressible fluid, viscid or inviscid, but inviscid unless the contrary is expressly stated. A finite portion of liquid, viscid or inviscid, being given at rest, within a bounding vessel of any shape, whether simply or multiply continuous; let any motion be suddenly produced in some part of the boundary, or throughout the boundary, subject only to the enforced condition of unchanging volume. Every particle of the liquid will instantaneously commence moving with the determinate velocity and in the determinate direction, such that the kinetic energy of the whole is less than that of any other motion which the liquid could have with the given motion of its boundary. This proposition is true also for an incompressible elastic solid, manifestly ; (and for the ideal “ether” of Proc. R.S.E., March 7, 1890; and Art. xcix. vol. iii. of my Collected Mathematical and Physical Papers). The truth of the proposition for the case of a viscous liquid is very important in practical hydraulics. As an example of its application to inviscid and viscous fluid and to elastic solid consider an elastic jelly standing in an open rigid mould, and equal bulks of water and of an inviscid liquid in two vessels equal and similar to it. Give equal sudden motions to the three containing vessels: the instantaneous motions of the three contained substances will be the same.
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- Copyright © Royal Society of Edinburgh 1897
References
page 119 note * Cambridge and Dublin Mathematical Journal, Feb. 1849. This is only a particular case of a general kinetic theorem for any material system whatever, communicated to the Royal Society, Edinburgh, April 6, 1863, without proof (Proceedings, 1862–63, p. 114), and proved in Thomson and Tait's Natural Philosophy, sec. 317, with several examples. Mutual forces between the containing vessel and the liquid or elastic solid, such as are called into play by viscosity, elasticity, hesivity (or resistance to sliding between solid and solid), cannot modify the conclusion, and do not enter into the equations used in the demonstration.
page 120 note * Thomson and Tait's Natural Philosophy, sec. 312.
page 120 note † That is to say, motion such that the moment of momentum of every, spherical portion, large or small, is zero round every diameter.
page 121 note * Popular Lectures and Addresses, by Lord Kelvin, vol. i. pp. 19, 20, and 53, 54. See also Philosophical Magazine, 1887, second half-year: “On the formation of coreless vortices by the motion of a solid through an inviscid incompressible fluid”; “On the stability of steady and of periodic fluid motion”; “On maximum and minimum energy in vortex motion.”