ScienceGate
Advanced Search
Author Search
Journal Finder
Blog
Sign in / Sign up
ScienceGate
Search
Author Search
Journal Finder
Blog
Sign in / Sign up
Blow-up of solutions to semilinear wave equations with a scaling invariant critical damping
The Role of Metrics in the Theory of Partial Differential Equations
◽
10.2969/aspm/08510163
◽
2020
◽
Author(s):
Masahiro Ikeda
Keyword(s):
Wave Equations
◽
Blow Up
◽
Semilinear Wave Equations
◽
Scaling Invariant
◽
Critical Damping
Download Full-text
Related Documents
Cited By
References
The blow-up rate for a non-scaling invariant semilinear wave equations in higher dimensions
Nonlinear Analysis
◽
10.1016/j.na.2021.112445
◽
2021
◽
Vol 212
◽
pp. 112445
Author(s):
Mohamed Ali Hamza
◽
Hatem Zaag
Keyword(s):
Wave Equations
◽
Blow Up
◽
Higher Dimensions
◽
Semilinear Wave Equations
◽
Blow Up Rate
◽
Scaling Invariant
Download Full-text
The blow-up rate for a non-scaling invariant semilinear wave equations
Journal of Mathematical Analysis and Applications
◽
10.1016/j.jmaa.2019.123652
◽
2020
◽
Vol 483
(2)
◽
pp. 123652
◽
Cited By ~ 1
Author(s):
Mohamed Ali Hamza
◽
Hatem Zaag
Keyword(s):
Wave Equations
◽
Blow Up
◽
Semilinear Wave Equations
◽
Blow Up Rate
◽
Scaling Invariant
Download Full-text
Existence, blow-up, and exponential decay estimates for a system of semilinear wave equations associated with the helicalflows of Maxwell fluid
Mathematical Methods in the Applied Sciences
◽
10.1002/mma.3643
◽
2015
◽
Vol 39
(9)
◽
pp. 2334-2357
Author(s):
Le Thi Phuong Ngoc
◽
Cao Huu Hoa
◽
Nguyen Thanh Long
Keyword(s):
Exponential Decay
◽
Wave Equations
◽
Blow Up
◽
Maxwell Fluid
◽
Decay Estimates
◽
Semilinear Wave Equations
Download Full-text
A Lyapunov functional and blow-up results for a class of perturbed semilinear wave equations
Nonlinearity
◽
10.1088/0951-7715/25/9/2759
◽
2012
◽
Vol 25
(9)
◽
pp. 2759-2773
◽
Cited By ~ 11
Author(s):
M A Hamza
◽
H Zaag
Keyword(s):
Lyapunov Functional
◽
Wave Equations
◽
Blow Up
◽
Semilinear Wave Equations
Download Full-text
The blow-up curve of solutions of mixed problems for semilinear wave equations with exponential nonlinearities in one space dimension, I
Calculus of Variations and Partial Differential Equations
◽
10.1007/pl00009924
◽
2001
◽
Vol 13
(1)
◽
pp. 69-95
◽
Cited By ~ 3
Author(s):
Paul Godin
Keyword(s):
Wave Equations
◽
Space Dimension
◽
Blow Up
◽
Semilinear Wave Equations
◽
Mixed Problems
◽
One Space Dimension
Download Full-text
The Blow-Up Rate for Strongly Perturbed Semilinear Wave Equations in the Conformal Case
Mathematical Physics Analysis and Geometry
◽
10.1007/s11040-015-9183-8
◽
2015
◽
Vol 18
(1)
◽
Cited By ~ 3
Author(s):
M. A. Hamza
◽
O. Saidi
Keyword(s):
Wave Equations
◽
Blow Up
◽
Semilinear Wave Equations
◽
Blow Up Rate
Download Full-text
Blow-up for semilinear wave equations with time-dependent damping in an exterior domain
Communications on Pure & Applied Analysis
◽
10.3934/cpaa.2020143
◽
2020
◽
Vol 19
(7)
◽
pp. 3885-3900
Author(s):
Mohamed Jleli
◽
◽
Bessem Samet
Keyword(s):
Exterior Domain
◽
Wave Equations
◽
Blow Up
◽
Time Dependent
◽
Semilinear Wave Equations
Download Full-text
Short time blow-up by negative mass term for semilinear wave equations with small data and scattering damping
The Role of Metrics in the Theory of Partial Differential Equations
◽
10.2969/aspm/08510391
◽
2020
◽
Author(s):
Ning-An Lai
◽
Nico Michele Schiavone
◽
Hiroyuki Takamura
Keyword(s):
Wave Equations
◽
Blow Up
◽
Mass Term
◽
Small Data
◽
Negative Mass
◽
Semilinear Wave Equations
◽
Short Time
Download Full-text
Blow up of solutions of semilinear wave equations related to nonlinear waves in de Sitter spacetime
SN Partial Differential Equations and Applications
◽
10.1007/s42985-021-00145-0
◽
2021
◽
Vol 3
(1)
◽
Author(s):
Kimitoshi Tsutaya
◽
Yuta Wakasugi
Keyword(s):
Nonlinear Waves
◽
Wave Equations
◽
Blow Up
◽
De Sitter Spacetime
◽
De Sitter
◽
Semilinear Wave Equations
◽
Sitter Spacetime
Download Full-text
Global Existence and Blow-up for Semilinear Wave Equations with Variable Coefficients
Chinese Annals of Mathematics Series B
◽
10.1007/s11401-018-0087-3
◽
2018
◽
Vol 39
(4)
◽
pp. 643-664
Author(s):
Qian Lei
◽
Han Yang
Keyword(s):
Global Existence
◽
Wave Equations
◽
Blow Up
◽
Variable Coefficients
◽
Semilinear Wave Equations
Download Full-text
Sign in / Sign up
Close
Export Citation Format
Close
Share Document
Close