Locally Convex Structure of Some Algebras of Holomorphic Functions of Several Variables

## Distort.ion Properties of Holomorphic Functions of Several Complex Variables By RYSZARD l &bZUR of Kielce (Poland) (Eingegtlngen am 9.7.1980) Abstract.. Let Q(D) be a class of funct,ions q, q(0) = 0, Iq(z)l < 1 holomorphic in the REINHAUDT domain D c Cn, a and barbitrary fixed numbers satisfyin

## On the diagonalization of holomorphic matrix functions of several variables By DIETER HETTNEMANN in Berlin (Eingegangen am 10.7. 1979) Let X c C n be a domain of holomorphy, L(Ck) be the space of complex k x kmatrices and GL(Ck) be the group of the invertible complex k x k-matrices. Two holom

## Abstract We shall be concerned in this paper with mathematical programming problem of the form: Φ~0~(__f__) → min subject to Φ__~i~__(__f__) ≦ 0, __i__ = 1, 2, …, __r__; __f__ where Φ__~i~__(__f__), __i__ = 0, 1, …, __r__ are regularly locally convex functions is a family of complex functions th

In the first part, we generalize the classical result of Bohr by proving that an m Ž analogous phenomenon occurs whenever D is an open domain in ‫ރ‬ or, more . Ž . ϱ generally, a complex manifold and is a basis in the space of holomorphic n ns0 Ž . Ž . functions H D such that s 1 and z s 0, n G 1,