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References
D.E. Alspach. Quotients of C[0,1] with separable dual, Israel J. of Math., 27 (1978), 361–384.
D.E. Alspach and Y. Benyamini. C(K) quotients of separable L ∞ spaces, Israel J. of Math., 32 (1979), 145–160.
S. Argyros, E. Odell and H. Rosenthal. In preparation.
S. Banach. “Théorie des opérations lińeaires”, Chelsea, New York, 1932.
S. Banach and S. Saks. Sur la convergence forte dan les champs L p, Studia Math., 2 (1930), 51–57.
B. Beauzamy and J.-T. Lapresté. “Modèles étalés des espaces de Banach”, Travaux en cours, Hermann, Paris, 1984.
C. Bessaga and A. Pelczyński. Spaces of continuous functions IV, Studia Math., 19 (1960), 53–60.
J. Bourgain. On convergent sequences of continuous functions, Bull. Soc. Math. Bel., 32 (1980), 235–249.
J. Bourgain. The Szlenk index and operators on C(K)-spaces, Bull. Soc. Math. de Belgique 31 Ser B (1979) 87–117.
J. Bourgain, H.P. Rosenthal and G. Schechtman. An ordinal L p-index for Banach spaces with an application to complemented subspaces of L P, Annals of Math., 114 (1981), 193–228.
T. Figiel and W.B. Johnson. A uniformly convex Banach space which contains no l p , Compositio Math., 29 (1974), 179–190.
D.C. Gillespie and W.A. Hurwitz. On sequences of continuous functions having continuous limits, Trans. AMS, 32 (1930), 527–543.
S. Mazur. Über konvexe Mengen in linearen normierte Räumen, Studia Math., 4 (1933), 70–84.
S. Mazurkiewicz and W. Sierpinski. Contribution à la topologie des ensembles dénombrables, Fund. Math., 1 (1920), 17–27.
J. Schreier. Ein Gegenbeispiel zur Theorie der schwachen Konvergenz, Studia Math., 2 (1930), 58–62.
W. Szlenk. The non-existence of a separable reflexive Banach space universal for all separable reflexive Banach spaces, Studia Math., 30 (1968), 53–61.
Z. Zalcwasser. Sur une proprieté der champ des fonctions continues, Studia Math., 2 (1930), 63–67.
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© 1988 Springer-Verlag Berlin Heidelberg
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Alspach, D., Odell, E. (1988). Averaging weakly null sequences. In: Odell, E.W., Rosenthal, H.P. (eds) Functional Analysis. Lecture Notes in Mathematics, vol 1332. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0081615
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DOI: https://doi.org/10.1007/BFb0081615
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