Asymptotic properties of vortex-pair solutions for incompressible Euler equations in R2

Abstract

A vortex pair solution of the incompressible 2d Euler equation in vorticity form ωt + ∇ · ∇ ω = 0 , = (-)-1 ω, in R2 × (0,∞) is a travelling wave solution of the form ω(x,t) = W(x1-ct,x2 ) where W(x) is compactly supported and odd in x2. We revisit the problem of constructing solutions which are highly -concentrated around points (0, q), more precisely with approximately radially symmetric, compactly supported bumps with radius and masses m. Fine asymptotic expressions are obtained, and the smooth dependence on the parameters q and for the solution and its propagation speed c are established. These results improve constructions through variational methods in [14] and in [5] for the case of a bounded domain.

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