The stability to three-dimensional disturbances of three classical steady vortex configurations in an incompressible inviscid fluid is studied in the limit of small vortex cross-sectional area and long axial disturbance wavelength. The configurations examined are the single infinite vortex row, the Karman vortex street of staggered vortices and the symmetric vortex street. It is shown that the single row is most unstable to a two-dimensional disturbance, while the Karman vortex street is most unstable to a three-dimensional disturbance over a significant range of street spacing ratios. The symmetric vortex street is found to be most unstable to three-dimensional or two-dimensional symmetric disturbances depending on the spacing ratio of the...
Free-streamline theory is employed to construct an exact steady solution for a linear array of hollo...
The stability of the finite-area K h & n ‘vortex street ’ to two-dimensional disturbances is det...
We determine and characterise relative equilibria for arrays of point vortices in a three-dimensiona...
The stability to three-dimensional disturbances of three classical steady vortex configurations in a...
International audienceThis paper investigates numerically and through an asymptotic approach the thr...
The stability of two-dimensional infinitesimal disturbances of the inviscid Karman vortex street of ...
The stability of the finite-area Kármán ‘vortex street’ to two-dimensional disturbances is determine...
The three-dimensional linear stability of a rectilinear vortex of elliptical cross-section existing ...
The classical point-vortex model for a Kármán vortex street is linearly stable only for an isolated ...
A von Kármán vortex street generated in the usual way was subjected to a deceleration, thereby chang...
International audienceWe investigate the three-dimensional stability of the Karman vortex street in ...
This paper investigates the three-dimensional stability of the Lamb-Chaplygin vortex pair. Short-wav...
International audienceWe study the temporally developing three-dimensional stability of a row of cou...
The instability of the Karman vortex street is revisited under a spatio-temporal perspective that al...
International audienceThis paper investigates the three-dimensional stability of a Lamb-Chaplygin co...
Free-streamline theory is employed to construct an exact steady solution for a linear array of hollo...
The stability of the finite-area K h & n ‘vortex street ’ to two-dimensional disturbances is det...
We determine and characterise relative equilibria for arrays of point vortices in a three-dimensiona...
The stability to three-dimensional disturbances of three classical steady vortex configurations in a...
International audienceThis paper investigates numerically and through an asymptotic approach the thr...
The stability of two-dimensional infinitesimal disturbances of the inviscid Karman vortex street of ...
The stability of the finite-area Kármán ‘vortex street’ to two-dimensional disturbances is determine...
The three-dimensional linear stability of a rectilinear vortex of elliptical cross-section existing ...
The classical point-vortex model for a Kármán vortex street is linearly stable only for an isolated ...
A von Kármán vortex street generated in the usual way was subjected to a deceleration, thereby chang...
International audienceWe investigate the three-dimensional stability of the Karman vortex street in ...
This paper investigates the three-dimensional stability of the Lamb-Chaplygin vortex pair. Short-wav...
International audienceWe study the temporally developing three-dimensional stability of a row of cou...
The instability of the Karman vortex street is revisited under a spatio-temporal perspective that al...
International audienceThis paper investigates the three-dimensional stability of a Lamb-Chaplygin co...
Free-streamline theory is employed to construct an exact steady solution for a linear array of hollo...
The stability of the finite-area K h & n ‘vortex street ’ to two-dimensional disturbances is det...
We determine and characterise relative equilibria for arrays of point vortices in a three-dimensiona...