Three algorithmic approaches to the general position problem

Abstract

If G is a graph, then X⊂eq V(G) is a general position set if for every two vertices v,u∈ X and every shortest (u,v)-path P, it holds that no inner vertex of P lies in X. In this note we propose three algorithms to compute a largest general position set in G: an integer linear programming algorithm, a genetic algorithm, and a simulated annealing algorithm. These approaches are supported by examples from different areas of graph theory.

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