Hamiltonian bifurcation perspective on two interacting vortex pairs: From symmetric to asymmetric leapfrogging, period doubling, and chaos

Whitchurch, Brandon; Kevrekidis, P. G.; Koukouloyannis, V.

doi:10.1103/physrevfluids.3.014401

Cited by 5 publications

(7 citation statements)

References 15 publications

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“…The criterion developed explicitly in (33) and (34) appears to be in general accord with the results obtained by a different analysis and given in Eckhardt and Aref appendix B [17].…”

Section: Leapfrogging Criterionsupporting

confidence: 80%

“…We do not consider here any conditions of stability of the solutions presented, although we note that there is some computational consideration of this matter contained in Acheson [2]. The dynamical systems approach and stability issues are also pursued analytically in Berger [12], in Behring and Goodman [11], and in a numerical investigation in Whitchurch, Kevrekidis, and Koukouloyannis [33].…”

Section: Introductionmentioning

confidence: 99%

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Collinear interaction of vortex pairs with different strengths—Criteria for leapfrogging

Mavroyiakoumou

Berkshire

2020

Physics of Fluids

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We formulate a system of equations that describes the motion of four vortices made up of two interacting vortex pairs, where the absolute strengths of the pairs are different. Each vortex pair moves along the same axis in the same sense. In much of the literature, the vortex pairs have equal strength. The vortex pairs can either escape to infinite separation or undergo a periodic leapfrogging motion. We determine an explicit criterion in terms of the initial horizontal separation of the vortex pairs given as a function of the ratio of their strengths, to describe a periodic leapfrogging motion when interacting along the line of symmetry. In an appendix we also contrast a special case of interaction of a vortex pair with a single vortex of the same strength in which a vortex exchange occurs.

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“…The criterion developed explicitly in (33) and (34) appears to be in general accord with the results obtained by a different analysis and given in Eckhardt and Aref appendix B [17].…”

Section: Leapfrogging Criterionsupporting

confidence: 80%

Section: Introductionmentioning

confidence: 99%

Collinear interaction of vortex pairs with different strengths—Criteria for leapfrogging

Mavroyiakoumou

Berkshire

2020

Physics of Fluids

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“…In this section, we apply the method of harmonic balance (MHB) to the π-periodic differential equation (20). As noted in Sec.…”

Section: Methods Of Harmonic Balance and The Hill's Determinantmentioning

confidence: 99%

“…To apply the method of harmonic balance, we write the periodic solution to system (20) as a Fourier series. The following two observations allow us to simplify the form of this series.…”

Section: Application Of the Methodsmentioning

confidence: 99%

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Stability of leapfrogging vortex pairs: A semi-analytic approach

Behring

Goodman

2019

Phys. Rev. Fluids

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We investigate the stability of a one-parameter family of periodic solutions of the four-vortex problem known as 'leapfrogging' orbits. These solutions, which consists of two pairs of identical yet oppositely-signed vortices, were known to W. Gröbli (1877) and A. E. H. Love (1883), and can be parameterized by a dimensionless parameter α related to the geometry of the initial configuration. Simulations by Acheson (2000) and numerical Floquet analysis by Tophøj and Aref (2012) both indicate, to many digits, that the bifurcation occurs when 1/α = φ 2 , where φ is the golden ratio. This study aims to explain the origin of this remarkable value. Using a trick from the gravitational two-body problem, we change variables to render the Floquet problem in an explicit form that is more amenable to analysis. We then implement G. W. Hill's method of harmonic balance to high order using computer algebra to construct a rapidly-converging sequence of asymptotic approximations to the bifurcation value, confirming the value found earlier.

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Transition to instability of the leapfrogging vortex quartet

Goodman

Behring

2023

Mechanics Research Communications

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Hamiltonian bifurcation perspective on two interacting vortex pairs: From symmetric to asymmetric leapfrogging, period doubling, and chaos

Cited by 5 publications

References 15 publications

Collinear interaction of vortex pairs with different strengths—Criteria for leapfrogging

Collinear interaction of vortex pairs with different strengths—Criteria for leapfrogging

Stability of leapfrogging vortex pairs: A semi-analytic approach

Transition to instability of the leapfrogging vortex quartet

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