Abstract
In this paper, we mainly discuss the angle modulus of convexity δXa(ϵ) and the angle modulus of smoothness ρXa(ϵ) in a real normed linear space X, which are closely related to the classical modulus of convexity δX(ϵ) and the modulus of smoothness ρX(ϵ). Some geometric properties of the two moduli were investigated. In particular, we obtained a characterization of uniform non-squareness in terms of ρXa(1). Meanwhile, we studied the relationships between δXa(ϵ), ρXa(ϵ) and other geometric constants of real normed linear spaces through some equalities and inequalities. Moreover, these two coefficients were computed for some concrete spaces.
Funder
the Fundamental Research Funds for the Central Universities, Sun Yat-sen University
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference32 articles.
1. Uniformly convex spaces
2. Convexity of balls and fixed-point theorems for mappings with nonexpansive square;Goebel;Compos. Math.,1970
3. An application of Hahn-Banach’s theorem to modulus of convexity;Yang;Acta Math. Sci.,2001
4. On a generalized modulus of convexity and uniform normal structure;Yang;Acta Math. Sci.,2007
5. Uniform Convexity in Factor and Conjugate Spaces
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