Classification of Minimal Separating Sets of Low Genus Surfaces
Abstract
A minimal separating set in a connected topological space X is a subset L ⊂ X with the property that X L is disconnected, but if L is a proper subset of L, then X L is connected. Such sets show up in a variety of contexts. For example, in a wide class of metric spaces, if we choose distinct points p and q, then the set of points x satisfying d(x, p) = d(x, q) is a minimal separating set. In this paper we classify which topological graphs can be realized as minimal separating sets in surfaces of low genus. In general the question of whether a graph can be embedded at all in a surface is a difficult one, so our work is partly computational. We classify graphs embeddings which are minimal separating in a given genus and write a computer program to find all such embeddings and their underlying graphs.
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