Geometric phases for corotating elliptical vortex patches

Shashikanth, Banavara N.; Newton, Paul K.

doi:10.1063/1.1320855

Cited by 4 publications

(4 citation statements)

References 28 publications

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“…The cases N = 3 and N = 4 are considered. Adiabatic phases have been computed in this model previously by Newton [34] and by Shashikanth and Newton [42], and also in a model of interacting vortex patches by Shashikanth and Newton [43]. Pure reconstruction phases have been computed in an axisymmetric model of vortex rings in R 3 by Shashikanth and Marsden [44].…”

Section: Introduction: Symmetry and Reconstruction Phasesmentioning

confidence: 96%

Reconstruction phases in the planar three- and four-vortex problems

Hernández-Garduño

Shashikanth

2018

Nonlinearity

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Pure reconstruction phases-geometric and dynamic-are computed in the N -point-vortex model in the plane, for the cases N = 3 and N = 4. The phases are computed relative to a metric-orthogonal connection on appropriately defined principal fiber bundles. The metric is similar to the kinetic energy metric for point masses but with the masses replaced by vortex strengths. The geometric phases are shown to be proportional to areas enclosed by the closed orbit on the symmetry reduced spaces. More interestingly, simple formulae are obtained for the dynamic phases, analogous to Montgomery's result for the free rigid body, which show them to be proportional to the time period of the symmetry reduced closed orbits. For the case N = 3 a nonzero total vortex strength is assumed. For the case N = 4 the vortex strengths are assumed equal.

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Section: Introduction: Symmetry and Reconstruction Phasesmentioning

confidence: 96%

Reconstruction phases in the planar three- and four-vortex problems

Hernández-Garduño

Shashikanth

2018

Nonlinearity

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“…The prototype of a two-dimensional vortex is a vortex patch, defined as a connected, finite region of rotational fluid surrounded by fluid that is irrotational. The patch can be also viewed as the perpendicular section of an infinitely long rectilinear vortex tube whose vorticity distribution is invariant along the length of the tube [18]. If the region is circular of radius R and contains constant vorticity, ω = ω 0 , the vortex patch models a Rankine vortex, with the azimuthal velocity [19] v…”

Section: Interaction Of Vortex Patchesmentioning

confidence: 99%

The Vortex Merger Factor in Aircraft Wake Turbulence

Mokry¹

2005

Aeronaut. j.

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Vortex merger is studied within the context of twodimensional discrete vortex sheets and demonstrated on two equally oriented circular vortices and aircraft tip and flap vortices. It is confirmed that, depending on the wing load distribution, the latter may or may not coalesce into a single counter-rotating pair. The interaction of a vortex with an equally oriented shear layer, governed by the same physical principle, suggests a possible intensification of an aircraft vortex in cross-wind shear.

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“…recently studied the stability of a Gaussian vortex in an inhomogeneous fluid [36]. Similarly, a number of investigations have been conducted using interacting elliptical patches of constant vorticity (Kida vortices) to understand vortex mergers [25,33,44]. Elliptical Gaussian in linear flow field provides another family of base states for investigators to explore.…”

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confidence: 99%

Evaluation of the Biot–Savart Integral for Deformable Elliptical Gaussian Vortex Elements

Rossi

2006

SIAM J. Sci. Comput.

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This paper introduces two techniques for approximating the Biot-Savart integral for deforming elliptical Gaussian functions. The primary motivation is to develop a high spatial accuracy vortex method. The first technique is a regular perturbation of the streamfunction in the small parameter = a−1 a+1 where a 2 is the aspect ratio of the basis function. This perturbative technique is suitable for direct interactions. In the far field, the paper studies the applicability of the fast multipole method for deforming elliptical Gaussians since the multipole series are divergent. The noncompact basis functions introduce a new computational length scale that limits the efficiency of the multipole algorithm but by imposing a lower bound on the finest mesh size, one can approximate the far-field streamfunction to any specified tolerance.

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Geometric phases for corotating elliptical vortex patches

Cited by 4 publications

References 28 publications

Reconstruction phases in the planar three- and four-vortex problems

Reconstruction phases in the planar three- and four-vortex problems

The Vortex Merger Factor in Aircraft Wake Turbulence

Evaluation of the Biot–Savart Integral for Deformable Elliptical Gaussian Vortex Elements

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