A note on “improper” problems in partial differential equations

A novel framework for solving variational problems and partial differential equations for scalar and vector-valued data defined on surfaces is introduced in this paper. The key idea is to implicitly represent the surface as the level set of a higher dimensional function and to solve the surface equa

Both boundary value problems, the DIRICHLET and the RIEMANN-HILBERT problems, were solved by the author in the SOBOLEV space W l , p ( D ) , 2 < p < 00, for the elliptic differential eqiiation -= azu F ( 2 , uj, 2) in IJ Upps~lla (1952) 85-139

Dekker, New York), we showed that if a function f (x) meromorphic in all C p is a solution of a homogeneous linear differential equation (E) with coefficients in Q (x), then f # C p (x). Here we show that this conclusion is false in the case where (E) is with coefficients not in Q (x). ## 2001 Acad