ScienceGate
Advanced Search
Author Search
Journal Finder
Blog
Sign in / Sign up
ScienceGate
Search
Author Search
Journal Finder
Blog
Sign in / Sign up
Brezis–Gallouet–Wainger Type Inequalities and Blow-Up Criteria for Navier–Stokes Equations in Unbounded Domains
Communications in Mathematical Physics
◽
10.1007/s00220-017-3061-0
◽
2017
◽
Vol 359
(3)
◽
pp. 951-973
◽
Cited By ~ 3
Author(s):
Kohei Nakao
◽
Yasushi Taniuchi
Keyword(s):
Blow Up
◽
Stokes Equations
◽
Unbounded Domains
◽
Navier Stokes
◽
Navier Stokes Equations
Download Full-text
Related Documents
Cited By
References
Blow-up and Global Smooth Solutions for Incompressible Three-Dimensional Navier–Stokes Equations
Chinese Physics Letters
◽
10.1088/0256-307x/25/6/052
◽
2008
◽
Vol 25
(6)
◽
pp. 2115-2117
◽
Cited By ~ 3
Author(s):
Guo Bo-Ling
◽
Yang Gan-Shan
◽
Pu Xue-Ke
Keyword(s):
Blow Up
◽
Stokes Equations
◽
Three Dimensional
◽
Navier Stokes
◽
Smooth Solutions
◽
Navier Stokes Equations
◽
Global Smooth Solutions
Download Full-text
Pullback Attractors in $$V_g$$ for Non-autonomous 2D g-Navier–Stokes Equations in Unbounded Domains
Differential Equations and Dynamical Systems
◽
10.1007/s12591-021-00571-x
◽
2021
◽
Author(s):
Dao Trong Quyet
◽
Le Thi Thuy
Keyword(s):
Stokes Equations
◽
Unbounded Domains
◽
Navier Stokes
◽
Pullback Attractors
◽
Navier Stokes Equations
Download Full-text
Navier–Stokes equations with delays on unbounded domains
Nonlinear Analysis
◽
10.1016/j.na.2005.05.057
◽
2006
◽
Vol 64
(5)
◽
pp. 1100-1118
◽
Cited By ~ 21
Author(s):
María José Garrido-Atienza
◽
Pedro Marín-Rubio
Keyword(s):
Stokes Equations
◽
Unbounded Domains
◽
Navier Stokes
◽
Navier Stokes Equations
Download Full-text
On one-dimensional compressible Navier–Stokes equations for a reacting mixture in unbounded domains
Zeitschrift für angewandte Mathematik und Physik
◽
10.1007/s00033-017-0851-3
◽
2017
◽
Vol 68
(5)
◽
Cited By ~ 5
Author(s):
Siran Li
Keyword(s):
Stokes Equations
◽
Unbounded Domains
◽
Navier Stokes
◽
Navier Stokes Equations
◽
One Dimensional
Download Full-text
On blow-up space jets for the Navier–Stokes equations in R3 with convergence to Euler equations
Journal of Mathematical Physics
◽
10.1063/1.3012382
◽
2008
◽
Vol 49
(11)
◽
pp. 113101
◽
Cited By ~ 6
Author(s):
V. A. Galaktionov
Keyword(s):
Euler Equations
◽
Blow Up
◽
Stokes Equations
◽
Navier Stokes
◽
Navier Stokes Equations
Download Full-text
Blow-Up Criterion for 3D Navier-Stokes Equations and Landau-Lifshitz System in a Bounded Domain
Recent Developments of Mathematical Fluid Mechanics - Advances in Mathematical Fluid Mechanics
◽
10.1007/978-3-0348-0939-9_10
◽
2016
◽
pp. 175-182
Author(s):
Jishan Fan
◽
Tohru Ozawa
Keyword(s):
Bounded Domain
◽
Blow Up
◽
Stokes Equations
◽
Navier Stokes
◽
Navier Stokes Equations
◽
Blow Up Criterion
Download Full-text
Blow up criteria for the compressible Navier–Stokes equations
Mathematical Analysis in Fluid Mechanics - Contemporary Mathematics
◽
10.1090/conm/710/14364
◽
2018
◽
pp. 65-84
◽
Cited By ~ 1
Author(s):
Hi Choe
◽
Minsuk Yang
Keyword(s):
Blow Up
◽
Stokes Equations
◽
Navier Stokes
◽
Navier Stokes Equations
Download Full-text
Blow up of classical solutions to the isentropic compressible Navier–Stokes equations
Nonlinear Analysis Real World Applications
◽
10.1016/j.nonrwa.2015.03.005
◽
2015
◽
Vol 25
◽
pp. 112-117
◽
Cited By ~ 4
Author(s):
Ning-An Lai
Keyword(s):
Blow Up
◽
Stokes Equations
◽
Navier Stokes
◽
Classical Solutions
◽
Navier Stokes Equations
Download Full-text
Blow-Up Scenarios for the 3D Navier–Stokes Equations Exhibiting Sub-Criticality with Respect to the Scaling of One-Dimensional Local Sparseness
Journal of Mathematical Fluid Mechanics
◽
10.1007/s00021-013-0155-0
◽
2013
◽
Vol 16
(2)
◽
pp. 321-334
◽
Cited By ~ 2
Author(s):
Zachary Bradshaw
◽
Zoran Grujić
Keyword(s):
Blow Up
◽
Stokes Equations
◽
Navier Stokes
◽
Navier Stokes Equations
◽
One Dimensional
Download Full-text
Algebraic decay of weak solutions to 3D Navier-Stokes equations in general unbounded domains
Journal of Mathematical Analysis and Applications
◽
10.1016/j.jmaa.2020.124300
◽
2020
◽
Vol 491
(1)
◽
pp. 124300
Author(s):
Zhaoxia Liu
Keyword(s):
Weak Solutions
◽
Stokes Equations
◽
Unbounded Domains
◽
Navier Stokes
◽
Algebraic Decay
◽
Navier Stokes Equations
◽
General Unbounded Domains
Download Full-text
Sign in / Sign up
Close
Export Citation Format
Close
Share Document
Close