Literaturverzeichnis
H.Apiola, Every Nuclear Frechet Space is a Quotient of a Köthe Schwartz Space. Preprint.
E.Dubinsky, The structure of nuclear Frechet spaces. LNM720, Berlin-Heidelberg-New York, 1979.
S. Kwapien, Some remarks on (p,q)-absolutely summing operators inl p-spaces. Studia Math.29, 327–337 (1968).
R.Meise, A remark on the ported and the compact-open topology for spaces of holomorphic functions on nuclear Frechet spaces. Preprint.
A. Pelczynski, Some problems on bases in Banach and Frechet spaces. Israel J. Math.2, 132–138 (1964).
A. Pietsch undH. Triebel, Interpolationstheorie für Banachideale von beschränkten linearen Operatoren. Studia Math.31, 203–217 (1968).
D. Vogt, Charakterisierung der Unterräume vons. Math. Z.155, 109–117 (1977).
D. Vogt undM. Wagner, Charakterisierung der Quotientenräume vons und eine Vermutung von Martineau. Studia Math.67, 225–240 (1980).
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Wagner, MJ. Jeder nukleare (F)-Raum ist Quotient eines nuklearen Köthe-Raumes. Arch. Math 41, 169–175 (1983). https://doi.org/10.1007/BF01196874
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01196874