Metric characterizations of some subsets of the real line

Abstract

A metric space (X,d) is called a subline if every 3-element subset T of X can be written as T=\x,y,z\ for some points x,y,z such that d(x,z)=d(x,y)+d(y,z). By a classical result of Menger, every subline of cardinality 4 is isometric to a subspace of the real line. A subline (X,d) is called an n-subline for a natural number n if for every c∈ X and positive real number r∈ d[X2], the sphere S(c;r):=\x∈ X:d(x,c)=r\ contains at least n points. We prove that every 2-subline is isometric to some additive subgroup of the real line. Moreover, for every subgroup G⊂eq R, a metric space (X,d) is isometric to G if and only if X is a 2-subline with d[X2]=G+:= G[0,∞). A metric space (X,d) is called a ray if X is a 1-subline and X contains a point o∈ X such that for every r∈ d[X2] the sphere S(o;r) is a singleton. We prove that for a subgroup G⊂eq Q, a metric space (X,d) is isometric to the ray G+ if and only if X is a ray with d[X2]=G+. A metric space X is isometric to the ray R+ if and only if X is a complete ray such that Q+⊂eq d[X2]. On the other hand, the real line contains a dense ray X⊂eq R such that d[X2]= R+.