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ON THE BLOW-UP OF THE NON-LOCAL THERMISTOR PROBLEM

Published online by Cambridge University Press:  17 May 2007

N. I. Kavallaris
Affiliation:
Instytut Matematyczny, Uniwersytet Wrocławski, pl. Grunwaldzki 2/4, 50-384 Wrocław, Poland Wydział Matematyki, Informatyki i Ekonometrii, Uniwersytet Zielonogórski, ul. Szafrana 4a, 65-516 Zielona Góra, Poland (nkaval@math.ntua.gr; t.nadzieja@wmie.uz.zgora.pl)
T. Nadzieja
Affiliation:
Wydział Matematyki, Informatyki i Ekonometrii, Uniwersytet Zielonogórski, ul. Szafrana 4a, 65-516 Zielona Góra, Poland (nkaval@math.ntua.gr; t.nadzieja@wmie.uz.zgora.pl)
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Abstract

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The conditions under which the solution of the non-local thermistor problem

\begin{gather*} u_t=\Delta u+\frac{\lambda f(u)}{(\int_{\varOmega}f(u)\,\mathrm{d}x)^{2}},\quad x\in\varOmega\subset\mathbb{R}^N,\ N\geq2,\ t>0, \\ \frac{\partial u(x,t)}{\partial\nu}+\beta(x)u(x,t)=0,\quad x\in\partial\varOmega,\ t>0, \\ u(x,0)=u_0(x),\quad x\in\varOmega, \end{gather*}

blows up are investigated. We assume that $f(s)$ is a decreasing function and that it is integrable in $(0,\infty)$. Considering a suitable functional we prove that for all $\lambda\gt0$ the solution of the Neumann problem blows up in finite time. The same result is obtained for the Robin problem under the assumption that $\lambda$ is sufficiently large $(\lambda\gg 1)$. In the proof of existence of blow-up for the Dirichlet problem we use the subsolution technique. We are able to construct a blowing-up lower solution under the assumption that either $\lambda\gt\lambda^*$ or $0\lt\lambda\lt\lambda^*$, for some critical value $\lambda^*$, and that the initial condition is sufficiently large provided also that $f(s)$ satisfies the decay condition $\int_0^\infty[sf(s)-s^2f'(s)]\,\mathrm{d} s\lt\infty$.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2007