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A predual of \(l_1\) which is not isomorphic to a C(K) space. Proc. internat. Sympos. partial diff. Equ. Geometry normed lin. Spaces II. (English) Zbl 0253.46044


MSC:

46E10 Topological linear spaces of continuous, differentiable or analytic functions
46B10 Duality and reflexivity in normed linear and Banach spaces
Full Text: DOI

References:

[1] Bessaga, C.; Pelczynski, A., Spaces of continous functions (IV), Studia Math., 19, 53-62 (1960) · Zbl 0094.30303
[2] Gurari, V. I., Space of universal disposition, isotropic spaces and the Mazur problem on rotations of Banach spaces, Sibirski Math. Z., 7, 1002-1013 (1966) · Zbl 0166.39303
[3] Lazar, A. J.; Lindenstrauss, J., Banach spaces whose duals are L_1 spaces and their representing matrices, Acta Math., 126, 165-193 (1971) · Zbl 0209.43201
[4] J. LindenstraussExtension of compact operators, Mem. Amer. Math. Soc. No. 48, 1964.
[5] Lindenstrauss, J.; Pelczynski, A., Absolutely summing operators in ℒ_p spaces and their applications, Studia Math., 29, 275-326 (1968) · Zbl 0183.40501
[6] Lindenstrauss, J.; Rosenthal, H. P., The ℒ_p spaces, Israel J. Math., 7, 325-349 (1969) · Zbl 0205.12602
[7] C. Stegall,Banach spaces whose duals contain l_1 (Γ)with applications to the study of dual L_1 (μ)spaces, Trans. Amer. Math. Soc. (to appear). · Zbl 0259.46016
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