Finite-time Collapse of Three Point Vortices in the Plane


Citar

Texto integral

Acesso aberto Acesso aberto
Acesso é fechado Acesso está concedido
Acesso é fechado Somente assinantes

Resumo

We investigate the finite-time collapse of three point vortices in the plane utilizing the geometric formulation of three-vortexmotion from Krishnamurthy, Aref and Stremler (2018) Phys. Rev. Fluids 3, 024702. In this approach, the vortex system is described in terms of the interior angles of the triangle joining the vortices, the circle that circumscribes that triangle, and the orientation of the triangle. Symmetries in the governing geometric equations of motion for the general three-vortex problem allow us to consider a reduced parameter space in the relative vortex strengths. The well-known conditions for three-vortex collapse are reproduced in this formulation, and we show that these conditions are necessary and sufficient for the vortex motion to consist of collapsing or expanding self-similar motion. The geometric formulation enables a new perspective on the details of this motion. Relationships are determined between the interior angles of the triangle, the vortex strength ratios, the (finite) system energy, the time of collapse, and the distance traveled by the configuration prior to collapse. Several illustrative examples of both collapsing and expanding motion are given.

Sobre autores

Vikas Krishnamurthy

Erwin Schrodinger International Institute for Mathematics and Physics

Autor responsável pela correspondência
Email: vikas.krishnamurthy2@gmail.com
Áustria , Boltzmangasse 9, Vienna, 1090

Mark Stremler

Department of Biomedical Engineering and Mechanics

Email: vikas.krishnamurthy2@gmail.com
Estados Unidos da América, 460 Turner Street NE, Suite 304, Blacksburg, VA, 24061

Arquivos suplementares

Arquivos suplementares
Ação
1. JATS XML

Declaração de direitos autorais © Pleiades Publishing, Ltd., 2018