Wheeling around von Neumann–Jordan constant in Banach spaces

Alonso, Jesús José Beltrán de Heredia; Martin, P.; Papini, Pier Luigi

doi:10.4064/sm188-2-3

Cited by 36 publications

(22 citation statements)

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“…The von Neumann-Jordan constant C NJ (X) was first introduced by Clarkson [5] and reformulated as the above form by Kato, Maligranda and Takahashi in [10]. The last one was first introduced by Gao in [7] and used with the above notation by Alonso, Martín and Papini in [2]. Now let us collect some useful properties concerning these constants (see for example [2][3][4]8]):…”

Section: Definitions and Notationsmentioning

confidence: 98%

“…The last one was first introduced by Gao in [7] and used with the above notation by Alonso, Martín and Papini in [2]. Now let us collect some useful properties concerning these constants (see for example [2][3][4]8]):…”

Section: Definitions and Notationsmentioning

confidence: 99%

“…We would also like to thank Professor Papini for having provided us the electric version of the paper [2].…”

Section: Acknowledgmentsmentioning

confidence: 99%

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Some inequalities concerning the James constant in Banach spaces

Wang

Bi-jun

2009

Journal of Mathematical Analysis and Applications

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Section: Definitions and Notationsmentioning

confidence: 98%

Section: Definitions and Notationsmentioning

confidence: 99%

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Some inequalities concerning the James constant in Banach spaces

Wang

Bi-jun

2009

Journal of Mathematical Analysis and Applications

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“…Many recent studies have focused on the von NeumannJordan (NJ) constant and James constant (cf. [1][2][3][4][5][6][7][8][9][10][11][12][13]). The constant J (X) = sup min x + y , x − y : x, y ∈ S X is called the non-square or James constant of X .…”

Section: Introductionmentioning

confidence: 98%

A note on Jordan–von Neumann constant and James constant

Yang

2009

Journal of Mathematical Analysis and Applications

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Let X be a non-trivial Banach space. L. Maligranda conjectured C NJ (X) 1 + J (X) 2 /4 for James constant J (X) and von Neumann-Jordan constant C NJ (X) of X. Satit Saejung gave a proof of it in 2006. In this note, we show that the last step in Satit Saejung's proof is not valid. Using his proof, the result should be COn the other hand, we give a new proof of C NJ (X) 1 + J (X) 2 /4. As an application, we give a relation between J (X) and J (l p (X)). Now we are going to give a simple proof of C NJ (X) 1 + J (X) 2 /4, first we have the following lemma.Lemma 2.1. Let X be a Banach space and J the James constant of X . Then x + y + x − y J + 4 J − J 2 for any x, y ∈ S X .Proof. We can assume that J < 2. If max{ x + y , x − y } J , then x + y + x − y 2 J J + 4 J − J 2 . So we may also assume that ε := x − y J .(1) If J ε 4 J − J 2 : Since J = 2(1 − δ X ( J )), we have(2) If 4 J − J 2 ε 2:Lemma 2.2. Let X be a Banach space and J the James constant of X . Then x + y 2 + x − y 2 4 + J 2 , for any x, y ∈ X such that x 2 + y 2 = 2.

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“…There are also interesting connections between C NJ (X) and other geometrical constants (see e.g. [2]). …”

Section: The Von Neumann-jordan Constantmentioning

confidence: 99%

Normed spaces equivalent to inner product spaces and stability of functional equations

Chmieliński

2013

Aequat. Math.

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Abstract. Let (X, · ) be a normed space. If · i is an equivalent norm coming from an inner product, then the original norm satisfies an approximate parallelogram law. Applying methods and results from the theory of stability of functional equations we study the reverse implication. Mathematics Subject Classification (2010). 39B82, 46B03, 46B20, 46C15.Keywords. Normed space equivalent to inner product space, approximate parallelogram law, von Neumann-Jordan constant, quadratic functional equation, stability of functional equations.

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Wheeling around von Neumann–Jordan constant in Banach spaces

Cited by 36 publications

References 13 publications

Some inequalities concerning the James constant in Banach spaces

Some inequalities concerning the James constant in Banach spaces

A note on Jordan–von Neumann constant and James constant

Normed spaces equivalent to inner product spaces and stability of functional equations

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