Absorbing angles, Steiner minimal trees, and antipodality

Abstract

We give a new proof that a star \opi:i=1,...,k\ in a normed plane is a Steiner minimal tree of its vertices \o,p1,...,pk\ if and only if all angles formed by the edges at o are absorbing [Swanepoel, Networks 36 (2000), 104--113]. The proof is more conceptual and simpler than the original one. We also find a new sufficient condition for higher-dimensional normed spaces to share this characterization. In particular, a star \opi: i=1,...,k\ in any CL-space is a Steiner minimal tree of its vertices \o,p1,...,pk\ if and only if all angles are absorbing, which in turn holds if and only if all distances between the normalizations 1\|pi\|pi equal 2. CL-spaces include the mixed 1 and ∞ sum of finitely many copies of R1.