On metric spaces with the properties of de Groot and Nagata in dimension one

Abstract

A metric space (X,d) has the de Groot property GPn if for any points x0,x1,...,xn+2∈ X there are positive indices i,j,k n+2 such that i j and d(xi,xj) d(x0,xk). If, in addition, k∈\i,j\ then X is said to have the Nagata property NPn. It is known that a compact metrizable space X has dimension dim(X) n iff X has an admissible GPn-metric iff X has an admissible NPn-metric. We prove that an embedding f:(0,1) X of the interval (0,1) into a locally connected metric space X with property GP1 (resp. NP1) is open provided f is an isometric embedding (resp. f has distortion Dist(f)=\|f\|·\|f-1\|<2). This implies that the Euclidean metric cannot be extended from the interval [-1,1] to an admissible GP1-metric on the triode T=[-1,1][0,i]. Another corollary says that a topologically homogeneous GP1-space cannot contain an isometric copy of the interval (0,1) and a topological copy of the triode T simultaneously. Also we prove that a GP1-metric space X containing an isometric copy of each compact NP1-metric space has density not less than continuum.