Lower bounds on the blowup rate of vorticity in the Euler equations

Abstract

Under the assumption that a solution to the 3D incompressible Euler equations blows up at a time T and that T is the first such time, we establish lower bounds on the rate of blow-up of the maximum norm of the vorticity. In particular, when the domain is R3 or T3, we provide lower bounds on ∫0t ωL∞\,ds and s∈[0,t]\|ω\|L∞ for t sufficiently close to~T. Notably, this gives a quantitative description of the BKM blow-up criterion. Moreover, we provide pointwise-in-time lower bounds on~\|Dk ω\|L∞. Finally, we state some consequences on the blow-up rate of the derivative of the deformation tensor.

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