1. On Hamiltonian alternating cycles and paths
- Author
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Universidad de Sevilla. Departamento de Matemática Aplicada I (ETSII), Ministerio de Economía y Competitividad (MINECO). España, Claverol, Mercé, García, Alfredo, Garijo Royo, Delia, Seara, Carlos, Tejel, Javier, Universidad de Sevilla. Departamento de Matemática Aplicada I (ETSII), Ministerio de Economía y Competitividad (MINECO). España, Claverol, Mercé, García, Alfredo, Garijo Royo, Delia, Seara, Carlos, and Tejel, Javier
- Abstract
We undertake a study on computing Hamiltonian alternating cycles and paths on bicolored point sets. This has been an intensively studied problem, not always with a solution, when the paths and cycles are also required to be plane. In this paper, we relax the constraint on the cycles and paths from being plane to being 1-plane, and deal with the same type of questions as those for the plane case, obtaining a remarkable variety of results. For point sets in general position, our main result is that it is always possible to obtain a 1-plane Hamiltonian alternating cycle. When the point set is in convex position, we prove that every Hamiltonian alternating cycle with minimum number of crossings is 1-plane, and provide O(n) and O(n2) time algorithms for computing, respectively, Hamiltonian alternating cycles and paths with minimum number of crossings.
- Published
- 2018