6533b7d6fe1ef96bd12664f5
RESEARCH PRODUCT
Stefan-Boltzmann Radiation on Non-convex Surfaces
Timo Tiihonensubject
Surface (mathematics)Partial differential equationStefan–Boltzmann lawGeneral MathematicsWeak solutionMathematical analysisGeneral EngineeringIntegral equationsymbols.namesakeMaximum principlesymbolsHeat equationBoundary value problemMathematicsdescription
We consider the stationary heat equation for a non-convex body with Stefan–Boltzmann radiation condition on the surface. The main virtue of the resulting problem is non-locality of the boundary condition. Moreover, the problem is non-linear and in the general case also non-coercive and non-monotone. We show that the boundary value problem has a maximum principle. Hence, we can prove the existence of a weak solution assuming the existence of upper and lower solutions. In the two dimensional case or when a part of the radiation can escape the system we obtain coercivity and stronger existence result. © 1997 by B.G. Teubner Stuttgart-John Wiley & Sons, Ltd.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1997-01-10 | Mathematical Methods in the Applied Sciences |