Contractibilité du groupe linéaire des espaces de Hilbert de dimension infinie

Luc Illusie

Séminaire Bourbaki (1964-1966)

  • Volume: 9, page 105-113
  • ISSN: 0303-1179

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Illusie, Luc. "Contractibilité du groupe linéaire des espaces de Hilbert de dimension infinie." Séminaire Bourbaki 9 (1964-1966): 105-113. <http://eudml.org/doc/109684>.

@article{Illusie1964-1966,
author = {Illusie, Luc},
journal = {Séminaire Bourbaki},
keywords = {functional analysis},
language = {fre},
pages = {105-113},
publisher = {Société Mathématique de France},
title = {Contractibilité du groupe linéaire des espaces de Hilbert de dimension infinie},
url = {http://eudml.org/doc/109684},
volume = {9},
year = {1964-1966},
}

TY - JOUR
AU - Illusie, Luc
TI - Contractibilité du groupe linéaire des espaces de Hilbert de dimension infinie
JO - Séminaire Bourbaki
PY - 1964-1966
PB - Société Mathématique de France
VL - 9
SP - 105
EP - 113
LA - fre
KW - functional analysis
UR - http://eudml.org/doc/109684
ER -

References

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  1. [1] Dixmier ( J.) et Douady ( A.). - Champs continus d'espaces hilbertiens et de C -algèbres, Bull. Soc. math France, t. 91, 1963, p. 227-284. Zbl0127.33102MR163182
  2. [2] Dold ( Albrecht). - Partitions of unity in the theory of fibrations, Annals of Math., Series 2, t. 78, 1963, p. 223-255. Zbl0203.25402MR155330
  3. [3] Jaenich ( K.). - Vektorraum Bündel und der Raum der Fredholm-Operatoren, Dissertation Bonn, 1964. 
  4. [4] Kuiper ( Nicolaas). - The homotopy type of the unitary group of Hilbert space, Topology (à paraître). Zbl0129.38901
  5. [5] Lang ( Serge) . - Introduction to differentiable manifolds. - New York, Interscience Publishers, 1962. Zbl0103.15101MR155257
  6. [6] Michael ( Ernest A.). - Continuous selections, I, Annals of Math., Series 2, t. 63, 1956, p. 361-382. Zbl0071.15902MR77107
  7. [7] Milnor ( John). - On spaces having the homotopy type of a CW-complex, Trans. Amer. math. Soc., t. 90, 1959, p. 272-280. Zbl0084.39002MR100267
  8. [8] Palais ( Richard S.). - On the homotopy type of certain groups of operators, Topology (à paraître). Zbl0161.34501MR175130
  9. [9] Shih Weishu. - Séminaire sur la K-théorie topologique, Institut des Hautes Etudes Scientifiques, Bures-sur-Yvette, 1964/65. 

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