Geometric aspects of p-angular and skew p-angular distances

Abstract

Corresponding to the concept of p-angular distance αp[x,y]:= xp-1x- yp-1y, we first introduce the notion of skew p-angular distance βp[x,y]:= yp-1x- xp-1y for non-zero elements of x, y in a real normed linear space and study some of significant geometric properties of the p-angular and the skew p-angular distances. We then give some results comparing two different p-angular distances with each other. Finally, we present some characterizations of inner product spaces related to the p-angular and the skew p-angular distances. In particular, we show that if p>1 is a real number, then a real normed space X is an inner product space, if and only if for any x,y∈ X 0, it holds that αp[x,y]≥βp[x,y].