The Sitting Closer to Friends than Enemies Problem in Trees

Abstract

A metric space T is a real tree if for any pair of points x, y ∈ T all topological embeddings σ of the segment [0,1] into T, such that σ (0)=x and σ (1)=y, have the same image (which is then a geodesic segment from x to y). A signed graph is a graph where each edge has a positive or negative sign. The Sitting Closer to Friends than Enemies problem in trees has a signed graph S as an input. The purpose is to determine if there exists an injective mapping (called valid distance drawing) from V(S) to the points of a real tree such that, for every u ∈ V(S), for every positive neighbor v of u, and negative neighbor w of u, the distance between v and u is smaller than the distance between w and u. In this work, we show that a complete signed graph has a valid distance drawing in a real tree if and only if its subgraph composed of all (and only) its positive edges has an intersection representation by unit balls in a real tree. Besides, as an instrumental result, we show that a graph has an intersection representation by unit balls in a real tree if and only if it has an intersection representation by proper balls, and if and only if it has an intersection representation by arbitrary balls in a real tree.