Completions of r.a.t.-Valued Fields of Rational Functions

It is well known that a continuous function f : Z p Ä Q p can be expanded by Mahler's basis: f (x)= n=0 a n ( x n ), with a n Ä 0. Amice (Bull. Soc. Math. France 92 (1964), 117 180) has established conditions on the coefficients a n for the function f to be locally analytic, as well as more general

## Abstract In this paper we consider extensions of bounded vector‐valued holomorphic (or harmonic or pluriharmonic) functions defined on subsets of an open set Ω ⊂ ℝ^__N__^ . The results are based on the description of vector‐valued functions as operators. As an application we prove a vector‐value

## Abstract A real locally convex space is said to be __convenient__ if it is separated, bornological and Mackey‐complete. These spaces serve as underlying objects for a whole theory of differentiation and integration (see [4]) upon which infinite dimensional differential geometry is based (cf. [8]

## Abstract The main theme of this paper is the discussion of a parametrized family of solutions of a finite moment problem for rational matrix‐valued functions in the nondegenerate case. We will show that each member of this family is extremal in several directions concerning some point of the ope