Blasius theorem
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(Redirected from Blasius–Chaplygin formula)
In fluid dynamics, Blasius theorem states that [1][2][3] the force experienced by a two-dimensional fixed body in a steady irrotational flow is given by
and the moment about the origin experienced by the body is given by
Here,
- is the force acting on the body,
- is the density of the fluid,
- is the contour flush around the body,
- is the complex potential ( is the velocity potential, is the stream function),
- is the complex velocity ( is the velocity vector),
- is the complex variable ( is the position vector),
- is the real part of the complex number, and
- is the moment about the coordinate origin acting on the body.
The first formula is sometimes called Blasius–Chaplygin formula.[4]
The theorem is named after Paul Richard Heinrich Blasius, who derived it in 1911.[5] The Kutta–Joukowski theorem directly follows from this theorem.
References
[edit]- ^ Lamb, H. (1993). Hydrodynamics. Cambridge university press. pp. 91
- ^ Milne-Thomson, L. M. (1949). Theoretical hydrodynamics (Vol. 8, No. 00). London: Macmillan.
- ^ Acheson, D. J. (1991). Elementary fluid dynamics.
- ^ Eremenko, Alexandre (2013). "Why airplanes fly, and ships sail" (PDF). Purdue University.
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: CS1 maint: numeric names: authors list (link) - ^ Blasius, H. (1911). Mitteilung zur Abhandlung über: Funktionstheoretische Methoden in der Hydrodynamik. Zeitschrift für Mathematik und Physik, 59, 43-44.