An Expanding Self-Similar Vortex Configuration for the 2D Euler Equations

Abstract

This paper addresses the long-time dynamics of solutions to the 2D incompressible Euler equations. We construct solutions with continuous vorticity ω(x,t) concentrated around points j(t) that converge to a sum of Dirac delta masses as 0. These solutions are associated with the Kirchhoff-Routh point-vortex system, and the points j(t) follow an expanding self similar trajectory of spirals, with the support of the vorticities contained in balls of radius 3 around each j.

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