J. Diestel, W. Ruess, W. Schachermayer (1992), On weak Compactness in L 1 (; X), to appear in Proc. Am. Math. Soc.. Home/Search Document Not in Database Summary Related Articles Check |
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Two Generalizations of Komlós' Theorem with Lower.. - Balder, Hess (1996) (Correct)
....convergence of Young measures [9] or to refine classical results for relative weak compactness in L 1 spaces. As a fine example of the latter we mention the recent work of Saadoune [44] where the well known characterization of relative weak L 1 compactness of Diestel, Ruess and Schachermayer [28] is generalized. Recall that a sequence of functions or multifunctions (F n ) F n : Omega Y , is said to K converge to another function or multifunction F 0 : Omega Y (written as F n K F 0 ) if for every subsequence (F n j ) of (F n ) there exists a null set N such that for every ....
J. Diestel, W.M. Ruess and W. Schachermayer (1993). Weak compactness in L 1 (¯; X). Proc. Amer. Math. Soc. 118 447-453.
Martingale Measures For Discrete Time Processes With Infinite.. - Schachermayer (1992) (4 citations) Self-citation (Schachermayer) (Correct)
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J. Diestel, W. Ruess, W. Schachermayer (1992), On weak Compactness in L 1 (; X), to appear in Proc. Am. Math. Soc..
A Hilbert Space Proof of the Fundamental Theorem of Asset.. - Schachermayer (1992) (3 citations) Self-citation (Schachermayer) (Correct)
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J. Diestel, W. Ruess, W. Schachermayer (1992), On weak Compactness in L 1 (¯; X), to appear in Proc. Am. Math. Soc..
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