Skip to main navigation
Skip to search
Skip to main content
Experts@Minnesota Home
Home
Profiles
Research units
University Assets
Projects and Grants
Research output
Press/Media
Datasets
Activities
Fellowships, Honors, and Prizes
Search by expertise, name or affiliation
On stability of weak Navier–Stokes solutions with large L
3,∞
initial data
T. Barker, G. Seregin,
V. Šverák
School of Mathematics
Research output
:
Contribution to journal
›
Article
›
peer-review
13
Scopus citations
Overview
Fingerprint
Fingerprint
Dive into the research topics of 'On stability of weak Navier–Stokes solutions with large L
3,∞
initial data'. Together they form a unique fingerprint.
Sort by
Weight
Alphabetically
Keyphrases
Weak Solution
100%
NavierStokes
100%
Perturbation Theory
66%
Initial Datum
66%
Stability Properties
33%
Cauchy Problem
33%
Subsequence
33%
Global Well-posedness
33%
Good Theory
33%
Local Well-posedness
33%
NavierStokes Equations
33%
In(III)
33%
Homogeneous Field
33%
Mathematics
Weak Solution
100%
Initial Datum
100%
Perturbation Theory
66%
Posedness
66%
Initial Condition
33%
Subsequence
33%