Rigid and Flat Foldability of a Degree-Four Vertex in Origami

Zimmermann, Luca; Stanković, Tino

doi:10.1115/1.4044737

Cited by 10 publications

(2 citation statements)

References 20 publications

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“…Then, the unit angle U 1 decreases monotonously once t deviates from zero toward t = t max . This assumption is fully true for degree-4 vertices [58] and depends on the sector angle configuration and the RBMs of higher order vertices [52]. Thus, the CDS method examines only the case min(U 1 ) that occurs at t = t max :…”

Section: 26mentioning

confidence: 99%

A Computational Design Synthesis Method for the Generation of Rigid Origami Crease Patterns

Zimmermann

Shea

Stanković

2021

Journal of Mechanisms and Robotics

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Today most origami crease patterns employed in technical applications are selected from a handful of well-known origami principles. Computational algorithms capable of generating novel crease patterns either target artistic origami, focus on quadrilateral creased paper, or do not incorporate direct knowledge for the purposeful design of crease patterns tailored to engineering applications. The lack of computational methods for the generative design of crease patterns for engineering applications arises from a multitude of geometric complexities intrinsic to origami, such as rigid foldability and rigid body modes, many of which have been addressed by recent work of the authors. Based on these findings, in this paper we introduce a Computational Design Synthesis method for the generative design of novel crease patterns to develop origami concepts for engineering applications. The proposed method first generates crease pattern graphs through a graph grammar that automatically builds the kinematic model of the underlying origami and introduces constraints for rigid foldability. Then, the method enumerates all design alternatives that arise from the assignment of different rigid body modes to the internal vertices. These design alternatives are then automatically optimized and checked for intersection to satisfy the given design task. The proposed method is generic and applied here to two design tasks that are a rigidly foldable gripper and a rigidly foldable robotic arm.

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Section: 26mentioning

confidence: 99%

A Computational Design Synthesis Method for the Generation of Rigid Origami Crease Patterns

Zimmermann

Shea

Stanković

2021

Journal of Mechanisms and Robotics

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“…Fang et al [13,27] developed tessellated and stacked mechanical metamaterial by using the self-locking properties of DD4 vertices. Zimmermann & Stanković [28] derived a necessary and sufficient condition for the rigid-foldability of DD4 vertices when a certain fold angle is chosen as the driving angle. Izmestiev [29] classified all rigid-foldable Kokotsakis polyhedra with quadrangular bases, i.e.…”

Section: Introductionmentioning

confidence: 99%

Parametric solutions to the kinematics of developable degree-4 rigid origami vertices

Hu,

Zheng,

et al. 2023

Proc. R. Soc. A.

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Developable degree-4 (DD4) vertices have four facets and four creases and can be unfolded flat. The rigid-folding kinematics of DD4 vertices is rich in that it generally has two folding modes and can get stuck when two facets bind together. To study the full spectrum of the kinematics of DD4 vertices, parametric solutions for fold angles in terms of the cotangents of half-angles are derived from the opposite and adjacent fold angle relationships. It is shown that any two fold angles of a general DD4 vertex are related by the equation of a hyperbola. When the vertex has collinear creases or is flat-foldable, the pertinent hyperbola equations degenerate into linear relationships. Meanwhile, when DD4 vertices are classified into three categories according to Grashof’s criterion, both unique and binding folds can be readily located from the facet with the largest or smallest sector angle. The rigid-folding kinematics of typical vertices is then investigated. In addition to the flat state, the two folding modes can also be switched at the binding states if self-intersection is permitted. The results provide new formulae and clear geometric views on the rigid-folding kinematics of DD4 vertices, which are fundamental for constructing larger origami patterns.

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Assigning mountain-valley fold lines of flat-foldable origami patterns based on graph theory and mixed-integer linear programming

Chen

Fan

Bai

et al. 2020

Computers & Structures

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Rigid and Flat Foldability of a Degree-Four Vertex in Origami

Cited by 10 publications

References 20 publications

A Computational Design Synthesis Method for the Generation of Rigid Origami Crease Patterns

A Computational Design Synthesis Method for the Generation of Rigid Origami Crease Patterns

Parametric solutions to the kinematics of developable degree-4 rigid origami vertices

Assigning mountain-valley fold lines of flat-foldable origami patterns based on graph theory and mixed-integer linear programming

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