Regularity of a free boundary for viscosity solutions of nonlinear elliptic equations

In this paper, we study an extension of a C 1,α regularity theory developed by L. Caffarelli in [2] to some fully nonlinear elliptic equations of second order. In fact, we investigate a two-phase free boundary problem in which a fully nonlinear elliptic equation of second order is verified by the so

A procedure to match a Taylor series with a series of exponentials allows an adequate solution for a category of nonlinear ordinary differential equations. We deal with examples describing the motion of a metal ball in a fluid in order to determine the viscosity.

We study the boundedness and a priori bounds of global solutions of the problem u"0 in ;(0, ¹ ), j S j R # j S j "h(u) on j ;(0, ¹ ), where is a bounded domain in 1,, is the outer normal on j and h is a superlinear function. As an application of our results we show the existence of sign-changing sta

## Communicated by E. Meister We consider the plate equation in a polygonal domain with free edges. Its resolution by boundary integral equations is considered with double layer potentials whose variational formulation was given in Reference 25. We approximate its solution (u, (ju/jn)) by the Gale

This work presents a novel boundary integral method to treat the two-dimensional potential ¯ow due to a moving body with the Lyapunov surface. The singular integral equations are derived in singularity-free form by applying the Gauss ¯ux theorem and the property of the equipotential body. The modi®e