Exactly self-similar blow-up of the generalized De Gregorio equation
Abstract
We study exactly self-similar blow-up profiles fot the generalized De Gregorio model for the three-dimensional Euler equation: wt + auwx = uxw, ux = Hw We show that for any α ∈ (0, 1) such that |aα| is sufficiently small, there is an exactly self-similar Cα solution that blows up in finite time. This simultaneously improves on the result in ElJe by removing the restriction 1/α ∈ Z and El-GhMa,ChHoHu, which only deals with asymptotically self-similar blow-ups.
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