Life span of nonnegative solutions to certain quasilinear parabolic Cauchy problems
Electronic journal of differential equations, Tome 2003 (2003)
We consider the problem
with nonnegative, nontrivial, continuous initial condition,
An integral inequality is obtained that can be used to find an exponent $p_c$ such that this problem has no nontrivial global solution when $p \leq p_c$. This integral inequality may also be used to estimate the maximal $T greater than 0$ such that there is a solution for $0 \leq t less than T$. This is illustrated for the case $\rho \equiv 1$ and $h \equiv 1$ with initial condition $u(x,0)=\sigma u_0(x), \sigma greater than 0$, by obtaining a bound of the form $T \le C_0 \sigma^{-\vartheta}$.
| $ \rho(x)u_t-\Delta u^m=h(x,t)u^{1+p}, \quad x \in \mathbb{R}^N, \; t>0, $ |
| $ u(x,0)=u_0(x) \not\equiv 0, \quad u_0(x)\ge 0, \; x \in \mathbb{R}^N. $ |
Classification :
35K55, 35B33, 35B30
Keywords: nonlinear parabolic equation, blow-up, lifespan, critical exponent
Keywords: nonlinear parabolic equation, blow-up, lifespan, critical exponent
@article{EJDE_2003__2003__a72,
author = {Kuiper, Hendrik J.},
title = {Life span of nonnegative solutions to certain quasilinear parabolic {Cauchy} problems},
journal = {Electronic journal of differential equations},
year = {2003},
volume = {2003},
zbl = {1036.35027},
language = {en},
url = {http://geodesic.mathdoc.fr/item/EJDE_2003__2003__a72/}
}
Kuiper, Hendrik J. Life span of nonnegative solutions to certain quasilinear parabolic Cauchy problems. Electronic journal of differential equations, Tome 2003 (2003). http://geodesic.mathdoc.fr/item/EJDE_2003__2003__a72/