2006
DOI: 10.1016/j.jmaa.2005.11.005
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On James and von Neumann–Jordan constants and sufficient conditions for the fixed point property

Abstract: In this paper, we prove that a Banach space X and its dual space X * have uniform normal structure if C NJ (X) < (1 + √ 3)/2. The García-Falset coefficient R(X) is estimated by the C NJ (X)-constant and the weak orthogonality coefficient introduced by B. Sims. Finally, we present an affirmative answer to a conjecture by L. Maligranda concerning the relation between the James and C NJ (X)-constants for a Banach space.

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Cited by 38 publications
(24 citation statements)
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“…From (19) we obtain the estimate J(X * ) − J(X) ≤ 1 − J(X)/2 ≤ 1 − √ 2/2, and a similar one for J(X) − J(X * ). But probably this estimate is not sharp.…”
Section: Some Examplesmentioning
confidence: 62%
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“…From (19) we obtain the estimate J(X * ) − J(X) ≤ 1 − J(X)/2 ≤ 1 − √ 2/2, and a similar one for J(X) − J(X * ). But probably this estimate is not sharp.…”
Section: Some Examplesmentioning
confidence: 62%
“…Some weaker inequalities have been proved in [16], while a solution of the problem has been claimed in [19], but with a doubtful proof. The next theorem answers the problem in the affirmative, giving an even sharper inequality.…”
Section: Definitions and Notationsmentioning
confidence: 99%
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“…It is clear that 2 ≤ f ( ) ≤ 2(1 + 2 ) ≤ E( ) ≤ 2(1 + ) 2 . It is also worth noting that the first moduli E (X) has been proved to be very useful in the study of the well-known von Neumann-Jordan constant (see e.g., [3,4]). …”
Section: Introductionmentioning
confidence: 99%
“…Note that J(X) is also called the James constant in [8] and [13]. A Banach space X is termed uniformly nonsquare in the sense of James if J(X) < 2.…”
mentioning
confidence: 99%