Kohomologie mit Schranken und Fortsetzung holomorpher Funktionen durch lineare stetige Operatoren
Abstract
In this thesis we solve the coboundary equation δ c=d with bounds for cochains with values in a coherent subsheaf of some Op, where is a Stein manifold. In particular the existence of a finite set of global generators is not assumed. Our result applies therefore to the ideal sheaf JV⊂ ON of germs of holomorphic functions vanishing on a closed analytic submanifold V⊂N. Although we are mainly interested in the estimates for the solutions of δ c=d, the techniques used also lead to a proof for the classical Theorem B of Cartan for coherent subsheafs of some Op, avoiding the Mittag-Leffler argument. We derive an extension theorem for holomorphic functions on V to entire functions, with control on growth behaviour. As a corollary we construct a linear tame extension operator H(V) H(N) under the hypothesis that H(V) is linear tamely isomorphic to the infinite type power series space ∞(k1n), n= dimV; this condition is also necessary. Here the supnorms on H(V) are taken over intersections of V with polycylinders of polyradii em, m∈ . Aytuna asked how much, and what kind of, information about the complex analytic structure of V is carried by the Fr\'echet space H(V). We prove that H(V) is linear tamely isomorphic to a power series space of infinite type if and only if V is algebraic.
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