A weighted Birkhoff orthogonal James-type constant

Abstract

Let X be a real Banach space and λ∈[0,1]. Motivated by orthogonal versions of the James constant, we introduce the weighted Birkhoff orthogonal James-type constant Jλ(X)= \ \\|λx+(1-λ) y\|,\|λx-(1-λ) y\|\: x, y ∈ SX, x B y\, where \(λ∈[0,1]\) and x B y stands for Birkhoff orthogonality. We establish its basic bounds, stability properties, and reduction principles, and clarify its relations with the orthogonal James constant J(X). The 2 -Lipschitz continuity of Jλ(X) with respect to λ is proved. New characterizations of uniformly nonsquare spaces are obtained; in particular, Jλ(X)=1 for some λ∈(0,1) if and only if X is not uniformly nonsquare. We also discuss connections with strict convexity, uniform convexity, modulus of smoothness, and the von Neumann-Jordan constant.