Vladimir Sverak
Affiliations: | University of Minnesota, Twin Cities, Minneapolis, MN |
Area:
MathematicsGoogle:
"Vladimir Sverak"Children
Sign in to add trainee| Xiaodong Yan | grad student | 2000 | UMN |
| Kyungkeun Kang | grad student | 2002 | UMN |
| Seungsuk Seo | grad student | 2003 | UMN |
| Dapeng Du | grad student | 2005 | UMN |
| Pangyen Weng | grad student | 2005 | UMN |
| Gabriel Koch | grad student | 2006 | UMN |
| Upali P. Karunathilake | grad student | 2007 | UMN |
| Michalis Kontovourkis | grad student | 2007 | UMN |
| Alexander Korolev | grad student | 2008 | UMN |
| Antoine Choffrut | grad student | 2009 | UMN |
| Hao Jia | grad student | 2013 | UMN |
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Publications
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| Jia H, Stewart S, Sverak V. (2019) On the De Gregorio Modification of the Constantin–Lax–Majda Model Archive For Rational Mechanics and Analysis. 231: 1269-1304 |
| Jia H, Šverák V. (2018) Asymptotics of Stationary Navier Stokes Equations in Higher Dimensions Acta Mathematica Sinica. 34: 598-611 |
| Hu W, Sverak V. (2018) Dynamics of Geodesic Flows with Random Forcing on Lie Groups with Left-Invariant Metrics Journal of Nonlinear Science. 28: 2249-2274 |
| Seregin G, Sverak V. (2017) On global weak solutions to the Cauchy problem for the Navier-Stokes equations with large L3-initial data Nonlinear Analysis-Theory Methods & Applications. 154: 269-296 |
| Elgindi T, Hu W, Šverák V. (2017) On 2d Incompressible Euler Equations with Partial Damping Communications in Mathematical Physics. 355: 145-159 |
| Šverák V. (2017) Aspects of PDEs related to fluid flows Lecture Notes in Mathematics. 2179: 195-248 |
| Choi K, Hou TY, Kiselev A, et al. (2017) On the Finite‐Time Blowup of a One‐Dimensional Model for the Three‐Dimensional Axisymmetric Euler Equations Communications On Pure and Applied Mathematics. 70: 2218-2243 |
| Gallay T, Šverák V. (2015) Remarks on the Cauchy problem for the axisymmetric Navier-Stokes equations Confluentes Mathematici. 7: 67-92 |
| Jia H, Sverak V. (2015) Are the incompressible 3d Navier-Stokes equations locally ill-posed in the natural energy space? Journal of Functional Analysis. 268: 3734-3766 |
| Glatt-Holtz N, Šverák V, Vicol V. (2015) On Inviscid Limits for the Stochastic Navier–Stokes Equations and Related Models Archive For Rational Mechanics and Analysis. 217: 619-649 |