Boundary value problems and best approximation by holomorphic functions

In the author's paper [7] methods of monotone operator theory are applied to some cl-s of nonlinear boundary value problems for firat order elliptic syatema in the plane. Completing thew investigations, in this paper we deal with some simple limit c88e8 of such problems for holomorphic functions. Us

We show that complex mean-value interpolation, a generalization of Lagrange Hermite interpolation, may be defined in any domain that is C-convex, whereas the original definition required ordinary, real convexity. We also show that C-convex domains are the natural ones in which to perform mean-value

The bifurcation function for an elliptic boundary value problem is a vector field B(ω) on R d whose zeros are in a one-to-one correspondence with the solutions of the boundary value problem. Finite element approximations of the boundary value problem are shown to give rise to an approximate bifurcat