A Free Boundary Problem Involving Convection and Singular Absorption

In this paper, we study the free-boundary problem associated with a singular diffusion equation. An entropy equality derived by the authors for BV solutions in an earlier paper is used in its formulation. Existence, uniqueness, and regularity results are obtained.

This paper considers a discontinuous semilinear elliptic problem: where H is the Heaviside function, p a real parameter and R the unit ball in R2. We deal with the existence of solutions under suitable conditions on g, h, and p. It is shown that the free boundary, i.e. the set where u = p, is suffi

## Abstract Let Ω~__i__~ ⊂ ℝ^__N__^, __i__ = 0, 1, be two bounded separately star‐shaped domains such that \documentclass{article}\pagestyle{empty}\begin{document}$ \Omega \_0 \supset \bar \Omega \_1 $\end{document}. We consider the electrostatic potential __u__ defined in \documentclass{article}\p

## Communicated by J. C. Ne´de´lec A boundary element method is introduced to approximate the solution of a scattering problem for the Helmholtz equation with a generalized Fourier-Robin-type boundary condition given by a second-order elliptic differential operator. The formulation involves three