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Technical Note

An analytical formula for the Lagrange time in two-dimensional potential flow

Published online by Cambridge University Press:  04 July 2016

W. C. Hassenpflug
W. C. Hassenpflug*
Affiliation:
Department of Mechanical Engineering University of Stellenbosch South Africa
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Extract

Two-dimensional potential flow expressed by means of the complex potential function uses Euler coordinates, i.e. a fixed point approach. However, there are many cases where the identical particle time is required, for example the settling time of suspended particles, heat convection (because in incompressible potential flow the heat and flow equations are uncoupled), and dispersion of fluid particles due to distortion.

In real variables the differential equation for the Lagrange time is generally too complicated because it involves two coordinates as functions of time. In the following a differential equation of single complex variable is derived.

Type
Research Article
Information
The Aeronautical Journal , Volume 100 , Issue 992 , February 1996 , pp. 75 - 76
Copyright
Copyright © Royal Aeronautical Society 1996 

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References

1. Prandtl, L. and Tietjens, O.G. Fundamentals of Hydrodynamics and Aerodynamics, Dover, New York, 1957.Google Scholar
2. Tietjens, O.G. Strömungslehre, Vol I, Springer, Berlin, 1960.Google Scholar
3. Milne-Thomson, L.M. Theoretical Hydrodynamics, 5th Edition, Macmillan, London, 1968.Google Scholar