Balancing unit vectors

Abstract

Theorem A. Let x1,...,x2k+1 be unit vectors in a normed plane. Then there exist signs 1,...,2k+1∈\ 1\ such that Σi=12k+1i xi≤ 1. We use the method of proof of the above theorem to show the following point facility location result, generalizing Proposition 6.4 of Y. S. Kupitz and H. Martini (1997). Theorem B. Let p0,p1,...,pn be distinct points in a normed plane such that for any 1≤ i<j≤ n the closed angle pip0pj contains a ray opposite some p0pk, 1≤ k≤ n. Then p0 is a Fermat-Toricelli point of \p0,p1,...,pn\, i.e. x=p0 minimizes Σi=0nx-pi. We also prove the following dynamic version of Theorem A. Theorem C. Let x1,x2,... be a sequence of unit vectors in a normed plane. Then there exist signs 1,2,...∈\ 1\ such that Σi=12ki xi≤ 2 for all k∈. Finally we discuss a variation of a two-player balancing game of J. Spencer (1977) related to Theorem C.