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N.E. Kochin, I.A. Kibel, N.V. Rose (1963)
Theoretical Hydromechanics, Part 1
N.E. Zhukovsky (1950)
Theoretical Mechanics
W. Stekloff
Sur le mouvement d'un corps solide ayant une cavité de forme ellipsoïdale remplie par un liquide incompressible et sur les variations des latitudesAnnales de la Faculté des Sciences de Toulouse, 1
Stefan Friedl (2020)
Algebraic topologyGraduate Studies in Mathematics
S.V. Jacques (1957)
On the Possibility of Rigid-body Rotation of a FluidAppl. Math. Mech., 21
The paper of S.V. Jacques [1] deals with the problem of finding forms of cavities in which there exist uniform vortex motions of an ideal incompressible fluid. In [1] the surface of the cavity was assumed to be a surface of revolution. The present work solves this problem without resorting to this assumption.
Regular and Chaotic Dynamics – Springer Journals
Published: Feb 12, 2010
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