Incompressible 2D Euler equations with non-decaying random initial vorticity

Abstract

Consider a random initial vorticity ω0(x) = Σn∈ Z2 an φ(x-n), where φ is bounded and compactly supported and \an\ are independent, uniformly bounded, mean 0, variance 1 random variables (i.e. ω0 is an array of randomly weighted vortex blobs). We prove global well-posedness of weak solutions to the Euler equations in R2 for almost every such initial vorticity. The main contribution of our work is the construction of a corresponding initial velocity field that grows slowly at infinity, which enables us to apply a recent well-posedness result of Cobb and Koch.

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