Abstract
An edge-unfolding of a polyhedron is produced by cutting along edges and flattening the faces to a net, a connected planar piece with no overlaps. A grid unfolding allows additional cuts along grid edges induced by coordinate planes passing through every vertex. A vertex-unfolding permits faces in the net to be connected at single vertices, not necessarily along edges. We show that any orthogonal polyhedra of genus zero has a grid vertex-unfolding. (There are orthogonal polyhedra that cannot be vertex-unfolded, so some type of “gridding” of the faces is necessary.) For any orthogonal polyhedron P with n vertices, we describe an algorithm that vertex-unfolds P in O(n 2) time. Enroute to explaining this algorithm, we present a simpler vertex-unfolding algorithm that requires a 3 × 1 refinement of the vertex grid.
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Biedl, T., Demaine, E., Demaine, M., Lubiw, A., O’Rourke, J., Overmars, M., Robbins, S., Whitesides, S.: Unfolding some classes of orthogonal polyhedra. In: Proc. 10th Canad. Conf. Comput. Geom., pp. 70–71 (1998)
Demaine, E.D., Eppstein, D., Erickson, J., Hart, G.W., O’Rourke, J.: Vertex-unfoldings of simplicial manifolds. In: Bezdek, A. (ed.) Discrete Geometry, June 2002, pp. 215–228. Marcel Dekker, New York (2003); Preliminary version appeared, In: 18th ACM Symposium on Computational Geometry, Barcelona, pp. 237-243 (June 2002)
Demaine, E.D., Iacono, J., Langerman, S.: Grid vertex-unfolding of orthostacks. In: Proc. Japan Conf. Discrete Comp. Geom. LNCS (to appear, 2005)
Demaine, E.D., O’Rourke, J.: Open problems from CCCG 2004. In: Proc. 16th Canad. Conf. Comput. Geom. (2004)
Demaine, E.D., O’Rourke, J.: A survey of folding and unfolding in computational geometry. In: Goodman, J.E., Pach, J., Welzl, E. (eds.) Combinatorial and Computational Geometry, Cambridge Univ. Press, Cambridge (2005)
Paterson, M.S., Yao, F.F.: Optimal binary space partitions for orthogonal objects. J. Algorithms 13, 99–113 (1992)
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© 2006 Springer-Verlag Berlin Heidelberg
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Damian, M., Flatland, R., O’Rourke, J. (2006). Grid Vertex-Unfolding Orthogonal Polyhedra. In: Durand, B., Thomas, W. (eds) STACS 2006. STACS 2006. Lecture Notes in Computer Science, vol 3884. Springer, Berlin, Heidelberg. https://doi.org/10.1007/11672142_21
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DOI: https://doi.org/10.1007/11672142_21
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-32301-3
Online ISBN: 978-3-540-32288-7
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