Boundedness and evolution rates for a quasilinear reaction-diffusion equation
Abstract: We consider the following quasilinear reaction-diffusion equation $$ \partial_tu=Δum+(1+|x|)σup, \quad (x,t)\in\mathbb{R}N\times(0,\infty), $$ in dimension $N\geq3$ and in the range of exponents $1<p<m$ and $-\infty<σ<-2$. We prove that, for initial conditions $u_0$ satisfying $$ u_0\geq0, \quad u_0\not\equiv0, \quad \lim\limits_{|x|\to\infty}|x|^{-(σ+2)/(m-p)}u_0(x)=0, $$ the solution $u$ to the corresponding Cauchy problem remains uniformly bounded from above and below: $$ C_1\leq \|u(t)\|_{\infty}\leq C_2, \quad t\in(0,\infty), $$ for some positive constants $C_1$ and $C_2$. Under suitable conditions on $p$, we also establish the rate of expansion of the upper limit $R(t)$ of the positivity set for compactly supported data, that is, $$ At^β\leq R(t)\leq Bt^β, \quad β=-\frac{m-p}{σ(m-1)+2(p-1)}, $$ and a \emph{different time scale in outer sets}, that is $$ D_1t^{-α}\leq u(x,t)\leq D_2t^{-α}, \quad α=\frac{σ+2}{σ(m-1)+2(p-1)}, \quad {\rm if} \ |x|\geq Ct^β. $$ The boundedness is in striking contrast with the property of grow-up as $t\to\infty$ established in previous works by the authors for $σ>-2$, illustrating the character of threshold of the exponent $σ=-2$.
Paper Prompts
Sign up for free to create and run prompts on this paper using GPT-5.
Top Community Prompts
Collections
Sign up for free to add this paper to one or more collections.