Duality in Spaces of Nuclear and Integral Polynomials

We give a negative answer to the three-space problem for the Banach space properties to be complemented in a dual space and to be isomorphic to a dual space (solving a problem of Vogt [Lectures held in the Functional Analysis Seminar, DusseldorfÂWuppertal, Jan Feb. 1987] and another posed by D@ az e

An example of a Frechet space E is given such that the space of n-homogeneous ćontinuous polynomials on E, endowed with any of the natural topologies usually considered on it, is quasinormable for every n g N. This space has the particularity that all the natural topologies are different on it for n

We give representations of the Wilson polynomials and the continuous dual Hahn polynomials in terms of multidimensional generalizations of Barnes type integrals. Motivation is to study the Barnes type integrals from the viewpoint of the de Rham theory and holonomic systems.