Geometric Characterization of Interpolating Varieties for the (FN)-Space A0p of Entire Functions
From MaRDI portal
Publication:4838599
DOI10.4153/CJM-1995-002-9zbMath0827.30014OpenAlexW2333429389MaRDI QIDQ4838599
Alekos Vidras, Bao Qin Li, Carlos. A. Berenstein
Publication date: 4 December 1995
Published in: Canadian Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4153/cjm-1995-002-9
Entire functions of one complex variable (general theory) (30D20) Moment problems and interpolation problems in the complex plane (30E05)
Related Items (8)
Invariant subspaces of the integration operators on Hörmander algebras and Korenblum type spaces ⋮ Interpolation in \(H^p\) spaces over the right half-plane ⋮ Solutions of infinite order differential equations without the grouping phenomenon and a generalization of the Fabry-Pólya theorem ⋮ The range of the restriction map for a multiplicity variety in Hörmander algebras of entire functions ⋮ Geometric characterization of interpolation in the space of Fourier-Laplace transforms of ultradistributions of Roumieu type ⋮ On interpolation for Hörmander's algebras ⋮ Interpolating varieties for entire functions of minimal type ⋮ Every Separable Complex Fréchet Space with a Continuous Norm is Isomorphic to a Space of Holomorphic Functions
This page was built for publication: Geometric Characterization of Interpolating Varieties for the (FN)-Space A0p of Entire Functions
