1993
DOI: 10.1063/1.858639
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Chaotic transport by Rossby waves in shear flow

Abstract: Transport and mixing properties of Rossby waves in shear flow are studied using tools from Hamiltonian chaos theory. The destruction of barriers to transport is studied analytically, by using the resonance overlap criterion and the concept of separatrix reconnection, and numerically by using PoincarC sections. Attention is restricted to the case of symmetric velocity profiles with a single maximum; the Bickley jet with velocity profile sech' is considered in detail. Motivated by linear stability analysis and e… Show more

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Cited by 257 publications
(205 citation statements)
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“…Nonmonotonicity occurs when the flow shear reverses sign along some shearless curve, as is the case for zonal flows of geophysical and atmospheric interest. 4,7 One example is the Bickley jet for which the velocity profiles are symmetric with a single maximum.…”
Section: ͑11͒mentioning
confidence: 99%
See 1 more Smart Citation
“…Nonmonotonicity occurs when the flow shear reverses sign along some shearless curve, as is the case for zonal flows of geophysical and atmospheric interest. 4,7 One example is the Bickley jet for which the velocity profiles are symmetric with a single maximum.…”
Section: ͑11͒mentioning
confidence: 99%
“…Such waves play an important role in zonal sheared flows that occur in both oceans and atmospheres, like the Gulf stream and the jet current. 7 Due to the nonintegrable nature of the combined Hamiltonian, chaotic behavior occurs for the advected particle trajectories, even though the fluid velocity field need not be chaotic at all.…”
Section: ͑11͒mentioning
confidence: 99%
“…Their stable and unstable manifolds separate the flow regime into regions of fluid which do not mix. Analysis of saddle stagnation points is well established in fluid applications ranging from groundwater modeling [29,46], macro-and micromixing devices [17,2,6,50,42,21], and oceanographic flows [48,3,36,11,9,40]. The analogous entity in unsteady flows is that of a hyperbolic trajectory, a specific type of time-varying fluid parcel trajectory which possesses time-varying stable and unstable manifolds, whose locations govern fluid transport; cf.…”
Section: Introductionmentioning
confidence: 99%
“…Refs. 3,4), in celestial mechanics, [5] fluid dynamics [1] and atomic physics. [6] It has been shown [7,8] that nontwist regions appear generically in area-preserving maps that have a tripling bifurcation of an elliptic fixed point.…”
Section: Introductionmentioning
confidence: 99%