Nonexistence of asymptotically self-similar singularities in the Euler and the Navier–Stokes equations

Chae, Dongho

doi:10.1007/s00208-007-0082-6

Cited by 47 publications

(66 citation statements)

References 33 publications

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“…], see also [20] for 'pseudo self-similar solutions'). A study of self-similar blow-up in the settings adopted here was undertaken by the first author in a series of works [6,7,5,4]. The main two results obtained are the following…”

Section: Introductionmentioning

confidence: 99%

On Formation of a Locally Self-Similar Collapse in the Incompressible Euler Equations

Chae

Shvydkoy

2013

Arch Rational Mech Anal

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Abstract. The paper addresses the question of existence of a locally self-similar blow-up for the incompressible Euler equations. Several exclusion results are proved based on the L p -condition for velocity or vorticity and for a range of scaling exponents. In particular, in N dimensions if in self-similar variables u ∈ L p and u ∼ 1 t α/(1+α) , then the blow-up does not occur provided α > N/2 or −1 < α ≤ N/p. This includes the L 3 case natural for the Navier-Stokes equations. For α = N/2 we exclude profiles with an asymptotic power bounds of the form |y| −N −1+δ |u(y)| |y| 1−δ . Homogeneous near infinity solutions are eliminated as well except when homogeneity is scaling invariant.

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Section: Introductionmentioning

confidence: 99%

On Formation of a Locally Self-Similar Collapse in the Incompressible Euler Equations

Chae

Shvydkoy

2013

Arch Rational Mech Anal

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“…As a result, the velocity field at the singularity time is Hölder continuous. Such behavior was also observed in the numerical simulation of the 3D Euler equations in [15], which is very different from the Leray type of self-similar solutions of the 3D Euler equations, whose existence has been ruled out under certain decay assumptions on the self-similar profiles [3][4][5].…”

Section: θ(X T) = (T − T)mentioning

confidence: 83%

Self-similar singularity of a 1D model for the 3D axisymmetric Euler equations

Hou

Liu

2015

Res Math Sci

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We investigate the self-similar singularity of a 1D model for the 3D axisymmetric Euler equations, which approximates the dynamics of the Euler equations on the solid boundary of a cylindrical domain. We prove the existence of a discrete family of self-similar profiles for this model and analyze their far-field properties. The self-similar profiles we find are consistent with direct simulation of the model and enjoy some stability property. Introduction and main results

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“…We remark that Dr. Chae, motivated by the result presented in this paper, has recently obtained more general nonexistence results for asymptotically self-similar singularities in the Euler and Navier-Stokes equations [3]. For more discussions regarding other aspects of the Navier-Stokes equations, we refer the reader to [5,20,16].…”

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confidence: 78%

Nonexistence of locally self-similar blow-up for the 3D incompressible Navier-Stokes equations

Hou¹,

Li²

2007

Discrete &Amp; Continuous Dynamical Systems - A

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Abstract. We study locally self-similar solutions of the three dimensional incompressible Navier-Stokes equations. The locally self-similar solutions we consider here are different from the global self-similar solutions. The self-similar scaling is only valid in an inner core region that shrinks to a point dynamically as the time, t, approaches a possible singularity time, T . The solution outside the inner core region is assumed to be regular, but it does not satisfy selfsimilar scaling. Under the assumption that the dynamically rescaled velocity profile converges to a limiting profile as t → T in L p for some p ∈ (3, ∞), we prove that such a locally self-similar blow-up is not possible. We also obtain a simple but useful non-blowup criterion for the 3D Euler equations.

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Nonexistence of asymptotically self-similar singularities in the Euler and the Navier–Stokes equations

Cited by 47 publications

References 33 publications

On Formation of a Locally Self-Similar Collapse in the Incompressible Euler Equations

On Formation of a Locally Self-Similar Collapse in the Incompressible Euler Equations

Self-similar singularity of a 1D model for the 3D axisymmetric Euler equations

Nonexistence of locally self-similar blow-up for the 3D incompressible Navier-Stokes equations

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