| Abstract: | Elliptic boundary value problems with analytic functionals as data have been studied by Lions and Magenes. In this papér we relax their assumption that the boundary of the domain ω is an analytic surface; we assume only that ω equals the interior of its closure. In this case we obtain results for the Dirichlet problem for second order equations that are analogous to theirs: There is a quasi-analytic class of functions on0ω with a natural topology such that the Dirichlet problem is well posed the data belongs to the dual of this space. The author acknowledges with gratitude the support he received from the National Science Foundation through a graduate fellowship and NSFGP 6761. Entrata in redazione il 31 gennaio 1969 |
