Tree covers of size 2 for the Euclidean plane

Abstract

For a given metric space (P,φ), a tree cover of stretch t is a collection of trees on P such that edges (x,y) of trees receive length φ(x,y), and such that for any pair of points u,v∈ P there is a tree T in the collection such that the induced graph distance in T between u and v is at most tφ(u,v). In this paper, we show that, for any set of points P on the Euclidean plane, there is a tree cover consisting of two trees and with stretch O(1). Although the problem in higher dimensions remains elusive, we manage to prove that for a slightly stronger variant of a tree cover problem we must have at least (d+1)/2 trees in any constant stretch tree cover in Rd.