Ill-Posedness of the 2D Euler Equations in a Logarithmically Refined Critical Sobolev Space
Abstract
In their seminal work, Bourgain and Li establish strong ill-posedness of the 2D Euler equations for initial velocity in the critical Sobolev space H2(R2). In this work, we extend those results by demonstrating strong ill-posedness in logarithmically regularized spaces which are strictly contained in H2(R2) and which contain Hs(R2) for all s>2. These spaces are constructed via application of a fractional logarithmic derivative to the critical Sobolev norm. We show that if the power α of the logarithmic derivative satisfies α≤ 1/2, then the 2D Euler equations are strongly ill-posed.
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