A characterisation of Euclidean normed planes via bisectors
Abstract
Our main result states that whenever we have a non-Euclidean norm \|·\| on a two-dimensional vector space X, there exists some x≠ 0 such that for every λ≠ 1, λ>0, there exist y, z∈ X verifying that \|y\|=λ\|x\|, z≠ 0, and z belongs to the bisectors B(-x,x) and B(-y,y). Throughout this paper we also state and prove some other simple but maybe useful results about the geometry of the unit sphere of strictly convex planes.
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