On a Type I Singularity Condition in Terms of the Pressure for the Euler Equations in ℝ3. (26th February 2021)

Record Type:
Journal Article
Title:
On a Type I Singularity Condition in Terms of the Pressure for the Euler Equations in ℝ3. (26th February 2021)
Main Title:
On a Type I Singularity Condition in Terms of the Pressure for the Euler Equations in ℝ3
Authors:
Chae, Dongho
Constantin, Peter
Abstract:
Abstract: We prove a blow up criterion in terms of the Hessian of the pressure of smooth solutions $u\in C([0, T); W^{2, q} (\mathbb R^3))$, $q>3$ of the incompressible Euler equations. We show that a blow up at $t=T$ happens only if $$\begin{align*} &\int_0 ^T \int_0 ^t \left\{\int_0 ^s \|D^2 p (\tau)\|_{L^\infty} \textrm{d}\tau \exp \left( \int_{s} ^t \int_0 ^{\sigma} \|D^2 p (\tau)\|_{L^\infty} \textrm{d}\tau \textrm{d}\sigma \right) \right\} \textrm{d}s \textrm{d}t \, = +\infty.\end{align*}$$ As consequences of this criterion we show that there is no blow up at $t=T$ if $ \|D^2 p(t)\|_{L^\infty } \le \frac{c}{(T-t)^2}$ with $c<1$ as $t\nearrow T$ . Under the additional assumption of $\int _0 ^T \|u(t)\|_{L^\infty (B(x_0, \rho ))} \textrm{d}t <+\infty $, we obtain localized versions of these results.
Is Part Of:
International mathematics research notices. Volume 2022:Number 12(2022)
Journal:
International mathematics research notices
Issue:
Volume 2022:Number 12(2022)
Issue Display:
Volume 2022, Issue 12 (2022)
Year:
2022
Volume:
2022
Issue:
12
Issue Sort Value:
2022-2022-0012-0000
Page Start:
9013
Page End:
9023
Publication Date:
2021-02-26
Subjects:
Mathematics -- Periodicals
510
Journal URLs:
http://imrn.oxfordjournals.org/
http://ukcatalogue.oup.com/
DOI:
10.1093/imrn/rnab014
Languages:
English
ISSNs:
1073-7928
Deposit Type:
Legaldeposit
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Physical Locations:
British Library DSC - 4544.001000
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