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Vladimir Sverak

Professor, Mathematics

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Projects 2005 2020

1 Active
9 Finished

Topic: Problems in non-linear PDEs

National Science Foundation

7/1/17 → 6/30/20

Project: Research project

The Twentieth Riviere Fabes Symposium

National Science Foundation

4/15/17 → 3/31/18

Project: Research project

Aspects of well-possedness and long time behavior of non

National Science Foundation

7/1/14 → 6/30/17

Project: Research project

The Sixteenth Riviere-Fabes Symposium

National Science Foundation

1/1/13 → 12/31/13

Project: Research project

FRG: Collaborative Research: Singularities, mixing, and

National Science Foundation

7/1/12 → 6/30/16

Project: Research project

Research

Research Output 1988 2019

54 Article
2 Chapter
1 Comment/debate
1 Editorial

On the De Gregorio Modification of the Constantin–Lax–Majda Model

Jia, H., Stewart, S. & Sverak, V., Feb 7 2019, In : Archive For Rational Mechanics And Analysis. 231, 2, p. 1269-1304 36 p.

Research output: Contribution to journal › Article

Unit circle

Damping

Model

Converge

Numerical Simulation

Asymptotics of Stationary Navier Stokes Equations in Higher Dimensions

Jia, H. & Sverak, V., Apr 1 2018, In : Acta Mathematica Sinica, English Series. 34, 4, p. 598-611 14 p.

Research output: Contribution to journal › Article

Stationary Navier-Stokes Equations

Stokes Equations

Navier Stokes equations

Higher Dimensions

Linear equation

1 Citation (Scopus)

Dynamics of Geodesic Flows with Random Forcing on Lie Groups with Left-Invariant Metrics

Hu, W. & Sverak, V., Dec 1 2018, In : Journal of Nonlinear Science. 28, 6, p. 2249-2274 26 p.

Research output: Contribution to journal › Article

Lie groups

Stochastic Perturbation

Invariant Metric

Geodesic Flow

Fokker-Planck Equation

2 Citations (Scopus)

On stability of weak Navier–Stokes solutions with large L^3,∞ initial data

Barker, T., Seregin, G. & Sverak, V., Apr 3 2018, In : Communications in Partial Differential Equations. 43, 4, p. 628-651 24 p.

Research output: Contribution to journal › Article

Navier-Stokes

Weak Solution

Perturbation Theory

Converge

Global Well-posedness

4 Citations (Scopus)

Regularity criteria for navier-stokes solutions

Seregin, G. & Sverak, V., Apr 19 2018, Handbook of Mathematical Analysis in Mechanics of Viscous Fluids. Springer International Publishing, p. 829-867 39 p.

Research output: Chapter in Book/Report/Conference proceeding › Chapter

Regularity Criterion

Navier-Stokes

regularity

Navier Stokes equations

Regularity

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