New Geometric Constants in Banach Spaces Related to the Inscribed Equilateral Triangles of Unit Balls

Geometric constant is one of the important tools to study geometric properties of Banach spaces. In this paper, we will introduce two new geometric constants JL(X) and YJ(X) in Banach spaces, which are symmetric and related to the side lengths of inscribed equilateral triangles of unit balls. The upper and lower bounds of JL(X) and YJ(X) as well as the values of JL(X) and YJ(X) for Hilbert spaces and some common Banach spaces will be calculated. In addition, some inequalities for JL(X), YJ(X) and some significant geometric constants will be presented. Furthermore, the sufficient conditions for uniformly non-square and normal structure, and the necessary conditions for uniformly non-square and uniformly convex will be established.

[1]  A simple inequality for the von Neumann–Jordan and James constants of a Banach space , 2009 .

[2]  K. Goebel Convexity of balls and fixed-point theorems for mappings with nonexpansive square , 1970 .

[3]  Satit Saejung On James and von Neumann–Jordan constants and sufficient conditions for the fixed point property , 2006 .

[4]  On a new geometric constant related to the von Neumann–Jordan constant , 2006 .

[5]  The Dunkl–Williams constant, convexity, smoothness and normal structure , 2008 .

[6]  M. Day Uniform Convexity in Factor and Conjugate Spaces , 1944 .

[7]  On n-th James and Khintchine constants of Banach spaces , 2008 .

[8]  Ka-Sing Lau,et al.  On two classes of Banach spaces with uniform normal structure , 1991 .

[9]  R. C. James,et al.  Uniformly Non-Square Banach Spaces , 1964 .

[10]  Geometric mean and triangles inscribed in a semicircle in Banach spaces , 2008 .

[11]  J. A. Clarkson The von Neumann-Jordan constant for the Lebesgue spaces , 1937 .

[12]  Teck-Cheong Lim,et al.  The center of a convex set , 1981 .

[13]  Joseph E. Borzellino,et al.  When is a Trigonometric Polynomial Not a Trigonometric Polynomial , 1935 .

[14]  William A. Kirk,et al.  A Fixed Point Theorem for Mappings which do not Increase Distances , 1965 .

[15]  L. Maligranda,et al.  On James and Jordan–von Neumann constants and the normal structure coefficient of Banach spaces , 2001 .

[16]  On a new geometric constant related to the modulus of smoothness of a Banach space , 2014 .