Circle Packing for Origami Design Is Hard
Abstract
We show that deciding whether a given set of circles can be packed into a rectangle, an equilateral triangle, or a unit square are NP-hard problems, settling the complexity of these natural packing problems. On the positive side, we show that any set of circles of total area 1 can be packed into a square of size 4/pi=2.2567... These results are motivated by problems arising in the context of origami design.
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