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Some Applications of Integral Formulas in Several Complex Variables

Jörgen Boo (Institutionen för matematik)
Göteborg : Chalmers University of Technology, 1996.
[Doktorsavhandling]

The thesis gives three examples of how integral formulas can be used in complex analysis.

We say that a set S in Cn is quadratically convex if through any point in its complement there is a quadratic hypersurface that does not intersect S. A quadratically convex set is called strongly quadratically convex if a certain generalization of the Fantappie transform (related to the set) is surjective. In the first paper, we prove that certain sets are strongly quadratically convex, and use the Cauchy-Fantappie-Leray integral representation formula for holomorphic functions to obtain an explicit inversion formula for the related transform.

Let D be a domain in Cn. Assume that the functions g1,...,gm are holomorphic and bounded in D, and that there is a constant .delta. such that 0<.delta.<=|g1|+...+|gm|. The Hp corona problem in D is the following: Given f in Hp(D), find ui in Hp(D) such that f=g1 u1+...+gm um. In the second paper, we use a weighted integral representation formula for holomorphic functions to solve this problem in the case where D is a non-degenerate analytic polyhedron.

In the third paper, we study solution operators for the d-bar operator that are canonical with respect to a certain metric in strictly pseudoconvex domains. Some features of the metric and the canonical operators are investigated. We show that certain known explicit solution operators in a sense approximately are the canonical ones. This enables us to draw conclusions concerning e.g. regularity properties of the canonical operators.



Denna post skapades 2006-08-25.
CPL Pubid: 1027

 

Institutioner (Chalmers)

Institutionen för matematik (1987-2001)

Ämnesområden

Matematik

Chalmers infrastruktur