On isosceles orthogonality and some geometric constants in a normed space

Abstract

We study the James constant J(X), an important geometric quantity associated with a normed space X , and explore its connection with isosceles orthogonality I. The James constant is defined as J(X) := \ \\|x+y\|, \|x-y\|\: x, y ∈ X,~ \|x\|=\|y\|=1 \. We prove that if J(X) is attained for unit vectors x, y ∈ X, then xI y. We also show that if X is a two-dimensional polyhedral Banach space then J(X) is always attained at an extreme point z of the unit ball of X, so that J(X) = \|z+y\| = \|z-y\|, where \| y \| = 1 and zI y. This helps us to explicitly compute the James constant of a two-dimensional polyhedral Banach space in an efficient way. We further study some related problems with reference to several other geometric constants in a normed space.

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