Holomorphic germs on Banach spaces
Chae Soo Bong
Annales de l'Institut Fourier, Tome 21 (1971), p. 107-141 / Harvested from Numdam

Soient E et F des espaces de Banach complexes, U un ouvert non-vide de E et K un compact de E. La notion de type d’holomorphie θ de E dans F et la topologie localement convexe naturelle 𝒯 ω,θ sur l’espace vectoriel θ (U,F) de toutes les applications holomorphes de U dans F, d’un type d’holomorphie donné θ, ont été considérées d’abord par L. Nachbin. C’est le motif pour lequel nous introduisons l’espace localement convexe θ (K,F) de tous les germes d’applications holomorphes autour de K dans F, d’un type d’holomorphie donné θ, en étudiant ses rapports avec θ (U,F), et quelques unes des propriétés de la topologie 𝒯 ω,θ .

Let E and F be two complex Banach spaces, U a nonempty subset of E and K a compact subset of E. The concept of holomorphy type θ between E and F, and the natural locally convex topology 𝒯 ω,θ on the vector space θ (U,F) of all holomorphic mappings of a given holomorphy type θ from U to F were considered first by L. Nachbin. Motived by his work, we introduce the locally convex space θ (K,F) of all germs of holomorphic mappings into F around K of a given holomorphy type θ, and study its interplay with θ (U,F) and some other properties of the topology 𝒯 ω,θ .

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     author = {Chae Soo Bong},
     title = {Holomorphic germs on Banach spaces},
     journal = {Annales de l'Institut Fourier},
     volume = {21},
     year = {1971},
     pages = {107-141},
     doi = {10.5802/aif.381},
     mrnumber = {49 \#9627},
     zbl = {0222.46018},
     language = {en},
     url = {http://dml.mathdoc.fr/item/AIF_1971__21_3_107_0}
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Chae Soo Bong. Holomorphic germs on Banach spaces. Annales de l'Institut Fourier, Tome 21 (1971) pp. 107-141. doi : 10.5802/aif.381. http://gdmltest.u-ga.fr/item/AIF_1971__21_3_107_0/

[A] H. Alexander, Analytic functions on a Banach space, Thesis, University of California at Berkeley (1968).

[Ch] S.B. Chae, Sur les espaces localement convexes de germes holomorphes, C.R. Ac. Paris, 271 (1970), 990-991. | MR 45 #876 | Zbl 0201.15603

[Ar] R.M. Aron, Topological properties of the space of holomorphic mappings, Thesis, University of Rochester (1970).

[B] J.A. Barroso, Topologia em espacos de aplicações holomorfas entre espaços localmente convexos, Thesis, Instituto de Matematica Pura e Aplicada, Rio de Janeiro (1970).

[C] G. Coeure, Fonctions plurisousharmoniques sur les espaces vectoriels topologiques et applications à l'étude des fonctions analytiques, Thèse, Université de Nancy (1969).

[D1] S. Dineen, Holomorphy type on a Banach space, Thesis, University of Maryland (1969).

[D2] S. Dineen, Holomorphic functions on a Banach space, Bulletin of American Mathematical Society (1970). | MR 41 #4216 | Zbl 0237.46027

[D3] S. Dineen, The Cartan-Thullen theorem for Banach spaces, to appear Annali della Scuola Normale Superiore de Pisa. | Numdam | Zbl 0235.46037

[D4] S. Dineen, Bounding subsets of a Banach space (to appear). | Zbl 0202.12803

[DS] J. Dieudonne, L. Schwartz, La dualité dans les espaces (F) et (LF), Annales de l'Institut Fourier, Grenoble, t. 1 (1949), 61-101. | Numdam | MR 38553 | MR 12,417d | Zbl 0035.35501

[GJ] L. Gillman, M. Jerison, Rings of continuous functions, Van Nostrand, Princeton (1960). | MR 116199 | MR 22 #6994 | Zbl 0093.30001

[Gr] A. Grothendieck, Sur les espaces (F) et (DF), Summa Brasiliensis Mathematicae, v. 3 (1954), 57-122. | MR 75542 | MR 17,765b | Zbl 0058.09803

[Gr2] A. Grothendieck, Produits tensoriels topologiques et espaces nucléaires, Memoirs of American Mathematical Society, n° 16 (1955). | MR 75539 | MR 17,763c | Zbl 0064.35501

[G] C.P. Gupta, Malgrange's theorem for nuclearly entire functions of bounded type on a Banach space, Thesis, University of Rochester (1966). Reproduced in Notas de Matematica, n° 37 (1968), Instituto de Matematica Pura e Aplicada, Rio de Janeiro. | MR 632066 | Zbl 0182.45402

[H] J. Horvath, Topological vector spaces and distributions, v. 1., Addison-Wesley, Mass. (1966). | MR 205028 | MR 34 #4863 | Zbl 0143.15101

[Hr] L. Hörmander, Introduction to complex analysis in several variables, Van Nostrand, Princeton (1966). | MR 203075 | Zbl 0138.06203

[L] P. Lelong, Fonctions et applications de type exponentiel dans les espaces vectoriels topologiques, C.R.A.c Paris 169 (1969). | MR 250052

[M1] A. Martineau, Sur les fonctionnelles analytiques et la transformation de Fourier-Borel, Journal d'Analyse Mathématique, v. 11 (1963), 1-164. | MR 159220 | MR 28 #2437 | Zbl 0124.31804

[M2] A. Martineau, Sur la topologie des espaces de fonctions holomorphes, Mathematische Annalen, v. 163 (1966), 62-88. | MR 190697 | MR 32 #8109 | Zbl 0138.38101

[Mt] M.C. Matos, Holomorphic mappings and domains of holomorphy, Thesis, University of Rochester (1970). | Zbl 0233.32004

[N1] L. Nachbin, Topological vector spaces of continuous functions, Proc. Nat. Acd. Sci. USA. v. 40 (1954), 471-4. | MR 63647 | MR 16,156h | Zbl 0055.09803

[N2] L. Nachbin, Lectures on topological vector spaces, Lecture note, University of Rochester (1963).

[N3] L. Nachbin, Lectures on the theory of distributions, University of Rochester (1963), Reproduced by Universidade do Recife (1964) ; North-Holland Publishing Company (1970). | Zbl 0135.16401

[N4] L. Nachbin, On the topology of the space of all holomorphic functions on a given open subset, Indagationes Mathematicae, Koninklijke Nederlandse Akademie van Wetenschappen, Proceedings, Series A 70 (1967), 366-368. | MR 35 #5910 | Zbl 0147.11402

[N5] L. Nachbin, On spaces of holomorphic functions of a given type, Proceedings of the Conference on Functional Analysisis, University of California at Irvine (1966), 50-60. Thompson Book Company (1967). | Zbl 0212.14604

[N6] L. Nachbin, Topology on spaces of holomorphic mappings, Ergebnisse der Mathematik und ihrer Grenzgebiete, v. 47 (1969), Springer-Verlag, Berlin. | MR 40 #7787 | Zbl 0172.39902

[N7] L. Nachbin, Convolution operators in spaces of nuclearly entire functions on a Banach space, Proceedings of the Symposium on Functional Analysis and Related Fields, University of Chicago (1969), Springer-Verlag, Berlin (in press). | Zbl 0217.16403

[N8] L. Nachbin, Holomorphic functions, domains of holomorphy and local properties, North-Holland Publishing Company (1970). | MR 43 #558 | Zbl 0208.10301

[N9] L. Nachbin, Concerning holomorphy types for Banach spaces, Studia Mathematica, Proceedings of the Colloquim on Nuclear Spaces and Ideals in Operator Algebras held in Warsaw, Poland, June 18-25, 1969.

[NG] L. Nachbin, C.P. Gupta, On Malgrange's theorem for nuclearly entire functions (to appear).

[Nr] P. Noverraz, Fonctions plurisousharmonique et analytiques dans les espaces vectoriels topologiques complexes, Annales de l'Institut Fourier, Grenoble, 19,2 (1969), 419-493. | Numdam | MR 42 #537 | Zbl 0176.09903

[P] H.R. Pitt, A note on bilinear forms, Journal London Math. Society, v. 11 (1936), 174-180. | JFM 62.0209.01 | Zbl 0014.31201

[R] H.P. Rosenthal, On quasi-complemented subspaces of Banach spaces, with an appendix on compactness of operators from Lp (µ) to Lr (v), Journal of Functional Analysis 4 (1969), 176-214. | MR 40 #3277 | Zbl 0185.20303

[T] F. Treves, Topological vector spaces, distributions and kernels, Academic Press, New York and London (1967). | MR 37 #726 | Zbl 0171.10402

[Z] M.A. Zorn, Characterization of analytic functions in Banach spaces, Annals of Mathematics, 12 (1945), 585-593. | MR 7,251e | Zbl 0063.08407