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We study half-space separation in the convexity of chordless paths of a graph, i. e. , monophonic convexity. In this problem, one is given a graph and two (disjoint) subsets of vertices and asks whether these two sets can be separated by complementary convex sets, called half-spaces. While it is known this problem is NP-complete for geodesic convexity -- the convexity of shortest paths -- we show that it can be solved in polynomial time for monophonic convexity.
Elaroussi et al. (Fri,) studied this question.
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