Self-affinity of discs under glass-cut dissections

Abstract

A topological disc is called n-self-affine if it has a dissection into n affine images of itself. It is called n-gc-self-affine if the dissection is obtained by successive glass-cuts, which are cuts along segments splitting one disc into two. For every n 2, we characterize all n-gc-self-affine discs. All such discs turn out to be either triangles or convex quadrangles. All triangles and trapezoids are n-gc-self-affine for every n. Non-trapezoidal quadrangles are not n-gc-self-affine for even n. They are n-gc-self-affine for every odd n 7, and they are n-gc-self-affine for n=5 if they aren't affine kites. Only four one-parameter families of quadrangles turn out to be 3-gc-self-affine. In addition, we show that every convex quadrangle is n-self-affine for all n 5.

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