Add to ORKGIn this paper, we show that the rigid-foldability of a given crease pattern using all creases is weakly NP-hard by a reduction from the partition problem, and that rigid-foldability with optional creases is NP-hard by a reduction from the 1-in-3 SAT problem. Unlike flat-foldabilty of origami or flexibility of other kinematic linkages, whose complexity originates in the complexity of the layer ordering and possible self-intersection of the material, rigid foldabilltiy from a planar state is hard even though there is no potential self-intersection. In fact, the complexity comes from the combinatorial behavior of the different possible rigid folding configurations at each vertex. The results underpin the fact that it is harder to fold from an ...
Origami-inspired engineering design is increasingly used in the development of self-folding structur...
Miura-ori is well-known for its capability of flatly folding a sheet of paper through a tessellated ...
Creased sheets can possess an exponential number of folding pathways accessible from the flat state....
We prove NP-hardness of deciding rigid foldability, that is, whether a sheet of material can be fold...
Origami (paper folding) is an effective tool for transforming two-dimensional materials into threedi...
Rigid origami is a class of origami whose entire surface remains rigid during folding except at crea...
AbstractWe explore the following problem: given a collection of creases on a piece of paper, each as...
Origami (paper folding) is an effective tool for transforming two-dimensional materials into threedi...
In this paper, we study how to fold a specified origami crease pattern in order to minimize the impa...
Abstract We study the problem of deciding whether a crease pattern can be folded by s...
We develop an intrinsic necessary and sufficient condition for single-vertex origami crease patterns...
Rigid foldability allows an origami pattern to fold about crease lines without twisting or stretchin...
Recent advances in robotics engineering have enabled the realization of self-folding machines. Rigid...
produced by the motion planner proposed in this paper. Abstract — Recent advances in robotics engine...
AbstractIn this paper, we study the problem of whether a polyhedron can be obtained from a net by fo...
Origami-inspired engineering design is increasingly used in the development of self-folding structur...
Miura-ori is well-known for its capability of flatly folding a sheet of paper through a tessellated ...
Creased sheets can possess an exponential number of folding pathways accessible from the flat state....
We prove NP-hardness of deciding rigid foldability, that is, whether a sheet of material can be fold...
Origami (paper folding) is an effective tool for transforming two-dimensional materials into threedi...
Rigid origami is a class of origami whose entire surface remains rigid during folding except at crea...
AbstractWe explore the following problem: given a collection of creases on a piece of paper, each as...
Origami (paper folding) is an effective tool for transforming two-dimensional materials into threedi...
In this paper, we study how to fold a specified origami crease pattern in order to minimize the impa...
Abstract We study the problem of deciding whether a crease pattern can be folded by s...
We develop an intrinsic necessary and sufficient condition for single-vertex origami crease patterns...
Rigid foldability allows an origami pattern to fold about crease lines without twisting or stretchin...
Recent advances in robotics engineering have enabled the realization of self-folding machines. Rigid...
produced by the motion planner proposed in this paper. Abstract — Recent advances in robotics engine...
AbstractIn this paper, we study the problem of whether a polyhedron can be obtained from a net by fo...
Origami-inspired engineering design is increasingly used in the development of self-folding structur...
Miura-ori is well-known for its capability of flatly folding a sheet of paper through a tessellated ...
Creased sheets can possess an exponential number of folding pathways accessible from the flat state....