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Linearized oscillations of a vortex column: the singular eigenfunctions

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dc.contributor.author Roy, Anubhab
dc.contributor.author Subramanian, Ganesh
dc.date.accessioned 2017-02-21T07:02:34Z
dc.date.available 2017-02-21T07:02:34Z
dc.date.issued 2014
dc.identifier.citation Roy, A; Subramanian, G, Linearized oscillations of a vortex column: the singular eigenfunctions. Journal of Fluid Mechanics 2014, 741, 404-460, http://dx.doi.org/10.1017/jfm.2013.666 en_US
dc.identifier.citation Journal of Fluid Mechanics en_US
dc.identifier.citation 741 en_US
dc.identifier.issn 0022-1120
dc.identifier.uri https://libjncir.jncasr.ac.in/xmlui/10572/2436
dc.description Restricted Access en_US
dc.description.abstract In 1880 Lord Kelvin analysed the linearized inviscid oscillations of a Rankine vortex as part of a theory of vortex atoms. These eponymously named neutrally stable modes are, however, exceptional regular oscillations that make up the discrete spectrum of the Rankine vortex. In this paper, we examine the singular oscillations that make up the continuous spectrum (CS) and span the entire base state range of frequencies. In two dimensions, the CS eigenfunctions have a twin-vortex-sheet structure similar to that known from earlier investigations of parallel flows with piecewise linear velocity profiles. The vortex sheets are cylindrical, being threaded by axial lines, with one sheet at the edge of the core and the other at the critical radius in the irrotational exterior; the latter refers to the radial location at which the fluid co-rotates with the eigenmode. In three dimensions, the CS eigenfunctions have core vorticity and may be classified into two families based on the singularity at the critical radius. For the first family, the singularity is a cylindrical vortex sheet threaded by helical vortex lines, while for the second family it has a localized dipole structure with radial vorticity. The presence of perturbation vorticity in the otherwise irrotational exterior implies that the CS modes, unlike the Kelvin modes, offer a modal interpretation for the (linearized) interaction of the Rankine vortex with an external vortical disturbance. It is shown that an arbitrary initial distribution of perturbation vorticity, both in two and three dimensions, may be evolved as a superposition over the discrete and CS modes; this modal representation being equivalent to a solution of the corresponding initial value problem. For the restricted case of an initial axial vorticity distribution in two dimensions, the modal representation may be generalized to a smooth vortex. Finally, for the three-dimensional case, the analogy between rotational flows and stratified shear flows, and the known analytical solution for stratified Couette flow, are used to clarify the singular manner in which the modal superposition for a smooth vortex approaches the Rankine limit. en_US
dc.description.uri 1469-7645 en_US
dc.description.uri http://dx.doi.org/10.1017/jfm.2013.666 en_US
dc.language.iso English en_US
dc.publisher Cambridge Univ Press en_US
dc.rights @Cambridge Univ Press, 2014 en_US
dc.subject Mechanics en_US
dc.subject Fluids & Plasmas Physics en_US
dc.subject Vortex Dynamics en_US
dc.subject Vortex Instability en_US
dc.subject Waves In Rotating Fluids en_US
dc.subject Trailing Line Vortex en_US
dc.subject Viscous Center Modes en_US
dc.subject Plane Couette-Flow en_US
dc.subject Lamb-Oseen Vortex en_US
dc.subject Layer-Type Flows en_US
dc.subject Shear Flows en_US
dc.subject Idealized Atmosphere en_US
dc.subject 2-Dimensional Vortex en_US
dc.subject Coherent Structure en_US
dc.subject Baroclinic Waves en_US
dc.title Linearized oscillations of a vortex column: the singular eigenfunctions en_US
dc.type Article en_US


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