Geometry of Banach spaces and biorthogonal systems

Dilworth, S.; Girardi, Maria; Johnson, W.

Dilworth, S. ; Girardi, Maria ; Johnson, W.

Studia Mathematica, Tome 141 (2000), p. 243-271 / Harvested from The Polish Digital Mathematics Library

Résumé

A separable Banach space X contains $ℓ_{1}$ isomorphically if and only if X has a bounded fundamental total $w c_{0} *$ -stable biorthogonal system. The dual of a separable Banach space X fails the Schur property if and only if X has a bounded fundamental total $w c_{0} *$ -biorthogonal system.

Publié le : 2000-01-01

Zbl 0963.46009

EUDML-ID : urn:eudml:doc:216766

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     author = {S. Dilworth and Maria Girardi and W. Johnson},
     title = {Geometry of Banach spaces and biorthogonal systems},
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     volume = {141},
     year = {2000},
     pages = {243-271},
     zbl = {0963.46009},
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Dilworth, S.; Girardi, Maria; Johnson, W. Geometry of Banach spaces and biorthogonal systems. Studia Mathematica, Tome 141 (2000) pp. 243-271. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-smv140i3p243bwm/

Bibliographie

[00000] [DJ] W. J. Davis and W. B. Johnson, On the existence of fundamental and total bounded biorthogonal systems in Banach spaces, Studia Math. 45 (1973), 173-179. | Zbl 0256.46026

[00001] [D1] J. Diestel, Sequences and Series in Banach Spaces, Springer, New York, 1984.

[00002] [D2] J. Diestel, A survey of results related to the Dunford-Pettis property, in: Proc. Conf. on Integration, Topology, and Geometry in Linear Spaces (Univ. North Carolina, Chapel Hill, NC, 1979), Amer. Math. Soc., Providence, RI, 1980, 15-60.

[00003] [DU] J. Diestel and J. J. Uhl, Jr., Vector Measures, with a foreword by B. J. Pettis, Math. Surveys 15, Amer. Math. Soc., Providence, RI, 1977.

[00004] [DRT] P. N. Dowling, N. Randrianantoanina and B. Turett, Remarks on James's distortion theorems, Bull. Austral. Math. Soc. 57 (1998), 49-54. | Zbl 0915.46013

[00005] [Dv] A. Dvoretzky, Some results on convex bodies and Banach spaces, in: Proc. Internat. Sympos. on Linear Spaces (Jerusalem, 1960), Jerusalem Academic Press, Jerusalem, 1961, 123-160.

[00006] [E] P. Enflo, A counterexample to the approximation problem in Banach spaces, Acta Math. 130 (1973), 309-317. | Zbl 0267.46012

[00007] [FS] C. Foiaş and I. Singer, On bases in C([0,1]) and L([0,1]), Rev. Roumaine Math. Pures Appl. 10 (1965), 931-960. | Zbl 0141.31102

[00008] [GK] K. Goebel and W. A. Kirk, Topics in Metric Fixed Point Theory, Cambridge University Press, Cambridge, 1990. | Zbl 0708.47031

[00009] [H1] J. Hagler, Embeddings of $l^{1}$ into conjugate Banach spaces, Ph.D. dissertation, Univ. of California, Berkeley, CA, 1972.

[00010] [H2] J. Hagler, Some more Banach spaces which contain $ℓ_{1}$ , Studia Math. 46 (1973), 35-42. | Zbl 0251.46023

[00011] [HJ] J. Hagler and W. B. Johnson, On Banach spaces whose dual balls are not weak* sequentially compact, Israel J. Math. 28 (1977), 325-330. | Zbl 0365.46019

[00012] [JR] W. B. Johnson and H. P. Rosenthal, On ω*-basic sequences and their applications to the study of Banach spaces, Studia Math. 43 (1972), 77-92.

[00013] [LT1] J. Lindenstrauss and L. Tzafriri, Classical Banach Spaces. I. Sequence Spaces, Ergeb. Math. Grenzgeb. 92, Springer, Berlin, 1977. | Zbl 0362.46013

[00014] [LT2] J. Lindenstrauss and L. Tzafriri, Classical Banach Spaces. II. Function Spaces, Ergeb. Math. Grenzgeb. 97, Springer, Berlin, 1979. | Zbl 0403.46022

[00015] [LT3] J. Lindenstrauss and L. Tzafriri, Classical Banach Spaces, Lecture Notes in Math. 338, Springer, Berlin, 1973, | Zbl 0259.46011

[00016] [M] A. I. Markushevich, On a basis in the wide sense for linear spaces, Dokl. Akad. Nauk SSSR 41 (1943), 241-244.

[00017] [Mil] V. D. Milman, Geometric theory of Banach spaces. II. Geometry of the unit ball, Uspekhi Mat. Nauk 26 (1971), no. 6, 73-149.

[00018] [OP] R. I. Ovsepian and A. Pełczyński, On the existence of a fundamental total and bounded biorthogonal sequence in every separable Banach space, and related constructions of uniformly bounded orthonormal systems in $L^{2}$ , Studia Math. 54 (1975), 149-159. | Zbl 0317.46019

[00019] [P] A. Pełczyński, All separable Banach spaces admit for every ε>0 fundamental total and bounded by 1+ε biorthogonal sequences, ibid. 55 (1976), 295-304. | Zbl 0336.46023

[00020] [P1] A. Pełczyński, On Banach spaces containing $L_{1} (μ)$ , ibid. 30 (1968), 231-246.

[00021] [S1] I. Singer, Bases in Banach Spaces. I, Grundlehren Math. Wiss. 154, Springer, New York, 1970.

[00022] [S2] I. Singer, On biorthogonal systems and total sequences of functionals, Math. Ann. 193 (1971), 183-188. | Zbl 0207.43004

[00023] [W] P. Wojtaszczyk, Banach Spaces for Analysts, Cambridge Univ. Press, Cambridge, 1991. | Zbl 0724.46012