Generalization of rigid foldable quadrilateral mesh origami

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https://riunet.upv.es/handle/10251/6828

Cita bibliográfica

Tachi, T. (2009). Generalization of rigid foldable quadrilateral mesh origami. Editorial Universitat Politècnica de València. https://riunet.upv.es/handle/10251/6828

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Resumen

In general, a quadrilateral mesh surface does not enable a continuous rigid motion because an overconstrained system, in which the number of constraints around degree-4 vertices (three for each vertex) exceeds the number of variables (the number of hinges), is constructed. However, it is known that the developable double corrugation surface, called Miura-ori, produces a rigid deployment mechanism. The rigid-foldability of Miura-ori is due to the singularity in its pattern, where a single vertex is repeated. We generalize the geometric condition for enabling rigid motion in general quadrilateral mesh origami without the trivial repeating symmetry. To ensure the existence of a finite motion, we derive the identity of functions from the formula for degree-4 single-vertex origami. This yields a variety of unexplored generalized shapes of quadrilateral mesh origami that preserve finite rigid-foldability in addition to developability and flat-foldability.

Descripción

p. 2287-2294

Fuente

Symposium of the International Association for Shell and Spatial Structures (50th. 2009. Valencia). Evolution and Trends in Design, Analysis and Construction of Shell and Spatial Structures : Proceedings isbn: 978-84-8363-461-5

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