Article
Embedding a graph in the grid of a surface with the minimum number of bends is NP-hard
Author/s | Garrido Vizuete, María de los Angeles
Márquez Pérez, Alberto |
Department | Universidad de Sevilla. Departamento de Matemática Aplicada I (ETSII) |
Publication Date | 1997 |
Deposit Date | 2016-01-27 |
Published in |
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Abstract | This paper is devoted to the study of graph embeddings in the grid of non-planar surfaces. We provide an adequate model for those embeddings and we study the complexity of minimizing the number of bends. In particular, we ... This paper is devoted to the study of graph embeddings in the grid of non-planar surfaces. We provide an adequate model for those embeddings and we study the complexity of minimizing the number of bends. In particular, we prove that testing whether a graph admits a rectilinear (without bends) embedding essentially equivalent to a given embedding, and that given a graph, testing if there exists a surface such that the graph admits a rectilinear embedding in that surface are NP-complete problems and hence the corresponding optimization problems are NP-hard. |
Citation | Garrido Vizuete, M.d.l.A. y Márquez Pérez, A. (1997). Embedding a graph in the grid of a surface with the minimum number of bends is NP-hard. Graph Drawing, 1353 (1997), 124-133. |
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