University of Pennsylvania researchers are turning kirigami, an art form related to origami that allows the paper to be cut, into a technique that can be applied to structures on radically divergent length scales. (Watch a video.)

The researchers lay out the rules for folding and cutting a hexagonal lattice into a wide variety of three-dimensional shapes. Because these rules ensure the proportions of the hexagons remain intact after the cuts and folds are made, the rules apply to starting materials of any size. This enables materials to be selected based on their relevance to the ultimate application, whether it is in nanotechnology, architecture or aerospace.

The study was published in the journal Physical Review Letters.

“If you see a fancy piece of origami,” one researcher says, “it can have arbitrarily small folds. We want to make something much simpler. If there are standards for the size of folds and cuts, we can make the math apply to any length scale. We can make channels, gates, steps and other 3-D shapes without needing to know anything about the size of the sheet and then combine those building blocks into even more complex shapes.”

A hexagonal lattice offers advantages over a seemingly simpler tessellation, such as one made from squares.

“The connected centers of the hexagons make triangles,” researchers say, “so, if you start with a hexagonal lattice, you get the triangles for free.”
Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.

“You can think of the sheet of paper as a template for a mesh of rods that you can lay on top of it,” one researcher says. “Alternatively, you can think of the paper as the membrane that attaches to a scaffolding. Both concepts are in the theory from the start; it’s just a question of whether you want to build the rods or the material between them.”

Having a set of rules that draws on fundamental mathematical principles means the kirigami approach can be applied equally across length scales, and with almost any material.

“The rules we lay out,” one researcher says, “tell you how you make the cuts so you only have to fold on straight lines, and so that, when you fold them together, the rods remain the same length and the centers remain the same distance apart. You may have to bend [or put hinges on] some of the rods to make the folds, but you don’t have to be able to stretch them. That also means the whole structure remains rigid when you’re done folding.”

The rules also guarantee that “modules,” basic shapes like channels that can direct the flow of fluids, can be combined into more complex ones. For example, iterating those folds and cuts can produce a ratcheting interface that can lock itself into place at different points. This structural feature could change the volume of a channel or even serve as an actuator for a robot.

Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working at such small scales.