On asymptotic properties of Banach spaces under renormings

Abstract

It is shown that a separable Banach space X can be given an equivalent norm |\!|\!|· |\!|\!| with the following properties: If (xn)⊂eq X is relatively weakly compact and m∞ n∞ |\!|\!| xm + xn |\!|\!| = 2m∞ |\!|\!| xm|\!|\!| then (xn) converges in norm. This yields a characterization of reflexivity once proposed by V.D.~Milman. In addition it is shown that some spreading model of a sequence in (X, |\!|\!|· |\!|\!|) is 1-equivalent to the unit vector basis of 1 (respectively, c0) implies that X contains an isomorph of 1 (respectively, c0).

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