Ill-posedness for the Euler equations in Besov spaces
Abstract
In the paper, we consider the Cauchy problem to the Euler equations in Rd with d≥2. We construct an initial data u0∈ Bσp,∞ showing that the corresponding solution map of the Euler equations starting from u0 is discontinuous at t = 0 in the metric of Bσp,∞, which implies the ill-posedness for this equation in Bσp,∞. We generalize the periodic result of Cheskidov and Shvydkoy Cheskidov.
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