Dynamical systems analysis of fluid transport in time-periodic vortex ring flows

• Published in: Physics of fluids (1994) Vol. 18; no. 4
• Main Authors: Shariff, Karim, Leonard, Anthony, Ferziger, Joel H.
• Format: Journal Article
• Language: English
• Published: Melville, NY American Institute of Physics 01.04.2006
• Subjects: Exact sciences and technology; Fluid dynamics; Fundamental areas of phenomenology (including applications); Inviscid flows with vorticity; Laminar flows; Physics; Rotational flow and vorticity; Vortex dynamics; Periodic flow; Poincaré section; Non viscous fluid; Vorticity; Entrainment; Ring vortex; Modelling; Vortex flow
• ISSN: 1070-6631; 1089-7666
• DOI: 10.1063/1.2189867

It is known that the stable and unstable manifolds of dynamical systems theory provide a powerful tool for understanding Lagrangian aspects of time-periodic flows. In this work we consider two time-periodic vortex ring flows. The first is a vortex ring with an elliptical core. The manifolds provide information about entrainment and detrainment of irrotational fluid into and out of the volume transported with the ring. The likeness of the manifolds with features observed in flow visualization experiments of turbulent vortex rings suggests that a similar process might be at play. However, what precise modes of unsteadiness are responsible for stirring in a turbulent vortex ring is left as an open question. The second situation is that of two leapfrogging rings. The unstable manifold shows striking agreement with even the fine features of smoke visualization photographs, suggesting that fluid elements in the vicinity of the manifold are drawn out along it and begin to reveal its structure. We suggest that interpretations of these photographs that argue for complex vorticity dynamics ought to be reconsidered. Recently, theoretical and computational tools have been developed to locate structures analogous to stable and unstable manifolds in aperiodic, or finite-time systems. The usefulness of these analogs is demonstrated, using vortex ring flows as an example, in the paper by Shadden, Dabiri, and Marsden [Phys. Fluids 18, 047105 (2006)].