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Kawasaki's theorem : ウィキペディア英語版 | Kawasaki's theorem
Kawasaki's theorem is a theorem in the mathematics of paper folding, named after Toshikazu Kawasaki, that gives a criterion for determining whether a crease pattern with a single vertex may be folded to form a flat figure. == Statement of the theorem == Maekawa's theorem states that the number of mountain folds in a flat-folded vertex figure differs from the number of valley folds by exactly two folds. From this it follows that the total number of folds must be even.〔 Therefore, suppose that a crease pattern consists of an even number of creases radiating from a single vertex , without specification of which creases should be mountain folds and which should be valley folds. In this crease pattern, let be the consecutive angles between the creases around , in clockwise order, starting at any one of the angles. Then Kawasaki's theorem is the statement that the crease pattern may be folded flat if and only if the alternating sum and difference of the angles adds to zero: : An equivalent way of stating the same condition is that, if the angles are partitioned into two alternating subsets, then the sum of the angles in either of the two subsets is exactly 180 degrees.〔.〕 However, this equivalent form applies only to a crease pattern on a flat piece of paper, whereas the alternating sum form of the condition remains valid for crease patterns on conical sheets of paper with nonzero defect at the vertex.〔.〕
抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「Kawasaki's theorem」の詳細全文を読む
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