A Regularity Criterion for the Navier–Stokes Equation Involving Only the Middle Eigenvalue of the Strain Tensor

Miller, Evan

doi:10.1007/s00205-019-01419-z

Cited by 39 publications

(61 citation statements)

References 38 publications

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“…A systematic search for such worst-case initial data using variational optimization methods is the main theme of this study. We add that while the analysis presented here was carried out based on the vorticity and enstrophy, an inequality analogous to (10) can also be obtained in terms of strain, i.e., the symmetric part of the velocity gradient ∇u, resulting in a smaller value of the constant prefactor (Miller, 2019).…”

Section: Bounds On the Growth Of Enstrophymentioning

confidence: 99%

Maximum amplification of enstrophy in three-dimensional Navier–Stokes flows

2020

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This investigation concerns a systematic search for potentially singular behavior in 3D Navier-Stokes flows. Enstrophy serves as a convenient indicator of the regularity of solutions to the Navier Stokes system -as long as this quantity remains finite, the solutions are guaranteed to be smooth and satisfy the equations in the classical (pointwise) sense. However, there are no estimates available with finite a priori bounds on the growth of enstrophy and hence the regularity problem for the 3D Navier-Stokes system remains open. In order to quantify the maximum possible growth of enstrophy, we consider a family of PDE optimization problems in which initial conditions with prescribed enstrophy E 0 are sought such that the enstrophy in the resulting Navier-Stokes flow is maximized at some time T . Such problems are solved computationally using a large-scale adjoint-based gradient approach derived in the continuous setting. By solving these problems for a broad range of values of E 0 and T , we demonstrate that the maximum growth of enstrophy is in fact finite and scales in proportion to E 3/2 0 as E 0 becomes large. Thus, in such worst-case scenario the enstrophy still remains bounded for all times and there is no evidence for formation of singularity in finite time. We also analyze properties of the Navier-Stokes flows leading to the extreme enstrophy values and show that this behavior is realized by a series of vortex reconnection events.

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Section: Bounds On the Growth Of Enstrophymentioning

confidence: 99%

Maximum amplification of enstrophy in three-dimensional Navier–Stokes flows

2020

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“…This provides more insight into the qualitative properties of blowup solutions than the regularity criteria that just involve the size of u or ω. The author also proved the following corollary of Theorem 1.4 in [17].…”

Section: Evan Millermentioning

confidence: 90%

“…Another regularity criterion with geometric significance is the regularity criterion in terms of the positive part of the intermediate eigenvalue of the strain matrix. This was first proven by Neustupa and Penel in [19][20][21] and independently by the author using different methods in [17].…”

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confidence: 83%

A locally anisotropic regularity criterion for the Navier–Stokes equation in terms of vorticity

Miller

2021

Proc. Amer. Math. Soc. Ser. B

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In this paper, we will prove a regularity criterion that guarantees solutions of the Navier-Stokes equation must remain smooth so long as the vorticity restricted to a plane remains bounded in the scale critical space L 4 t L 2 x , where the plane may vary in space and time as long as the gradient of the unit vector orthogonal to the plane remains bounded. This extends previous work by Chae and Choe that guaranteed that solutions of the Navier-Stokes equation must remain smooth as long as the vorticity restricted to a fixed plane remains bounded in a family of scale critical spaces. This regularity criterion also can be seen as interpolating between Chae and Choe's regularity criterion in terms of two vorticity components and Beirão da Veiga and Berselli's regularity criterion in terms of the gradient of vorticity direction. In physical terms, this regularity criterion is consistent with key aspects of the Kolmogorov theory of turbulence, because it requires that finite-time blowup for solutions of the Navier-Stokes equation must be fully three dimensional at all length scales.

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“…However, full regularity of Leary-Hopf weak solutions to the 3D Navier-Stokes system is still a fundamental open question. Starting from Serrin's famous work, regularity criteria of Leray-Hopf weak solutions are extensively studied (see [1][2][3]5,7,[9][10][11]13,[16][17][18][19][20][21][23][24][25][26]28,29] and references therein). The so-called Serrin type regularity criteria is that a weak solution u is regular on…”

Section: Introductionmentioning

confidence: 99%

On the Deformation Tensor Regularity for the Navier–Stokes Equations in Lorentz Spaces

Huang

2021

Bull. Malays. Math. Sci. Soc.

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This paper is concerned with the regularity criteria in terms of the middle eigenvalue of the deformation (strain) tensor $$\mathcal {D}(u)$$ D ( u ) to the 3D Navier–Stokes equations in Lorentz spaces. It is shown that a Leray–Hopf weak solution is regular on (0, T] provided that the norm $$\Vert \lambda _{2}^{+}\Vert _{L^{p,\infty }(0,T; L ^{q,\infty }(\mathbb {R}^{3}))} $$ ‖ λ 2 + ‖ L p , ∞ ( 0 , T ; L q , ∞ ( R 3 ) ) with $$ {2}/{p}+{3}/{q}=2$$ 2 / p + 3 / q = 2 $$( {3}/{2}<q\le \infty )$$ ( 3 / 2 < q ≤ ∞ ) is small. This generalizes the corresponding works of Neustupa–Penel and Miller.

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A Regularity Criterion for the Navier–Stokes Equation Involving Only the Middle Eigenvalue of the Strain Tensor

Cited by 39 publications

References 38 publications

Maximum amplification of enstrophy in three-dimensional Navier–Stokes flows

Maximum amplification of enstrophy in three-dimensional Navier–Stokes flows

A locally anisotropic regularity criterion for the Navier–Stokes equation in terms of vorticity

On the Deformation Tensor Regularity for the Navier–Stokes Equations in Lorentz Spaces

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