Self-affine quadrangles
Abstract
A quadrangle in the Euclidean plane is called n-self-affine if it has a dissection into n affine images of itself. All convex quadrangles are known to be n-self-affine for every n 5. The only 2-self-affine convex quadrangles are trapezoids. Here we characterize all 3-self-affine convex quadrangles, obtaining 5 one-parameter families and 13 singular examples of affine types. This way we reduce the quest for all n-self-affine convex quadrangles to the open case n=4. In addition, we show that there are n-self-affine non-convex quadrangles for all n 3, but not for n=2.
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