A note on parabolic radiation boundary conditions for elliptic wave calculations

We present a quenching result for semilinear parabolic equations with dynamic boundary conditions in bounded domains with a smooth boundary.

We consider a semilinear parabolic equation subject to a nonlinear dynamical boundary condition that is related to the so-called Wentzell boundary condition. First we prove the existence and uniqueness of global solutions as well as the existence of a global attractor. Then we derive a suitable Łoja

Materials which are heated by the passage of electricity are usually modeled by a nonlinear coupled system of two partial differential equations. The current equation is elliptic, while the temperature equation is parabolic. These equations are coupled one to another through the conductivities and t

Letters to the E&tors the heatmg se&Ion because the presence of the hot lammar sub-layer prevents the temperature decay m the wall These results show how local values of the heat transfer coefficient can &ffer from the average values, and Illustrate the approxunate nature of the model based on the b

The boundary condition, zero solids pressure at the top of a particle bed of maximum spoutable height, H m , is shown to eliminate any resort to empiricism in the derivation of the fluid velocity in the annulus of a spouted bed for which both viscous and inertial effects are taken into account. The