Structure of a bathtub vortex: importance of the bottom boundary layer

• Published in: Theoretical and computational fluid dynamics Vol. 24; no. 1-4; pp. 323 - 327
• Main Authors: Yukimoto, Shinji, Niino, Hiroshi, Noguchi, Takashi, Kimura, Ryuji, Moulin, Frederic Y.
• Format: Journal Article
• Language: English
• Published: Berlin/Heidelberg Springer-Verlag 01.03.2010; Springer; Springer Nature B.V; Springer Verlag
• Subjects: Angular momentum; Boundaries; Boundary layer; Classical and Continuum Physics; Computational fluid dynamics; Computational Science and Engineering; Engineering; Engineering Fluid Dynamics; Engineering Sciences; Fluid flow; Fluids mechanics; Flux; Mechanics; Original Article; Radial flow; Vortices; Potential vortex; Rotating and swirling flows; Bathtub vortex; 47.32C; Vortex dynamics; 47.15Cb; 47.32Ef; Boundary layers
• ISSN: 0935-4964; 1432-2250
• DOI: 10.1007/s00162-009-0128-3

A bathtub vortex in a cylindrical tank rotating at a constant angular velocity Ω is studied by means of a laboratory experiment, a numerical experiment and a boundary layer theory. The laboratory and numerical experiments show that two regimes of vortices in the steady-state can occur depending on Ω and the volume flux Q through the drain hole: when Q is large and Ω is small, a potential vortex is formed in which angular momentum outside the vortex core is constant in the non-rotating frame. However, when Q is small or Ω is large, a vortex is generated in which the angular momentum decreases with decreasing radius. Boundary layer theory shows that the vortex regimes strongly depend on the theoretical radial volume flux through the bottom boundary layer under a potential vortex : when the ratio of Q to the theoretical boundary-layer radial volume flux Q b (scaled by ) at the outer rim of the vortex core is larger than a critical value (of order 1), the radial flow in the interior exists at all radii and Regime I is realized, where R is the inner radius of the tank and ν the kinematic viscosity. When the ratio is less than the critical value, the radial flow in the interior nearly vanishes inside a critical radius and almost all of the radial volume flux occurs only in the boundary layer, resulting in Regime II in which the angular momentum is not constant with radius. This criterion is found to explain the results of the laboratory and numerical experiments very well.