Existence of nonsymmetric logarithmic spiral vortex sheet solutions to the 2D Euler equations

Abstract

We consider solutions of the 2D incompressible Euler equation in the form of M≥ 1 cocentric logarithmic spirals. We prove the existence of a generic family of spirals that are nonsymmetric in the sense that the angles of the individual spirals are not uniformly distributed over the unit circle. Namely, we show that if M=2 or M≥ 3 is an odd integer such that certain non-degeneracy conditions hold, then, for each n ∈ \ 1,2 \, there exists a logarithmic spiral with M branches of relative angles arbitrarily close to θk = knπ/M for k=0,1,… , M-1, which include halves of the angles of the Alexander spirals. We show that the non-degeneracy conditions are satisfied if M∈ \ 2, 3,5,7,9 \, and that the conditions hold for all odd M>9 given a certain gradient matrix is invertible, which appears to be true by numerical computations.

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