Symposium on Infinite Dimensional Topology
edited by R. D. Anderson.
Princeton, N.J. : Princeton University Press, 1972.
viii, 300 págs. ; 24 cm.
Serie: Annals of mathematics studies ; no. 69
ISBN: 0691080879
"Proceedings of the Symposium ... held in Baton Rouge from March 27 through April 1, 1967"—Preface.
Incluye referencias bibliográficas.
Reseña: MathSciNet, 49 #11514
Contenido
- C. Bessaga, Topological equivalence of non-separable reflexive Banach spaces. Ordinal resolutions of identity and monotone bases
- C. Bessaga and M. I. Kadec, On topological classification of non-separable Banach spaces
- Karel Borsuk, On homotopy properties of compact subsets of the Hilbert space
- H. H. Corson, Some thin sets in Fréchet spaces
- A. Douady, A remark on Banach analytic spaces
- James Eells, Jr., Fibring spaces of maps
- James Eells, Jr. and John McAlpin, An approximate Morse-Sard theorem
- Halldor I. Eliasson, Morse theory for closed curves
- Ky Fan, Covering properties of convex sets and fixed point theorems in topological vector spaces
- Kazimierz Geba and Andrzej Granas, On the cohomology theory in linear normed spaces
- G. Glaeser, Analyse de la technique de Nash-Moser
- Andrzej Granas, Generalizing the Hopf-Lefschetz fixed point theorem for non-compact ANR's
- David W. Henderson, Some questions in the dimension theory of infinite dimensional spaces
- R. B. Holmes, On the continuity of best approximation operators
- Robert C. James, Some self-dual properties of normed linear spaces
- G. Stephen Jones, Asymptotic fixed point theory
- Ronald J. Knill, On the relationship of local to global fixed-point indexes
- Nicolaas H. Kuiper, $C\sup1$-equivalence of functions near isolated critical points
- Jean Leray, Fixed point index and Lefschetz number
- Joram Lindenstrauss, Weakly compact sets
- -their topological properties and the Banach spaces they generate
- E. H. Rothe, On continuity and approximation questions concerning critical Morse groups in Hilbert space
- Raymond Y. T. Wong, On homeomorphisms of certain infinite dimensional spaces.