Rep-Tiles
Abstract
An n-dimensional rep-tile is a compact, connected submanifold of Rn with non-empty interior which can be decomposed into pairwise isometric rescaled copies of itself whose interiors are disjoint. We show that every smooth compact n-dimensional submanifold of Rn with connected boundary is topologically isotopic to a polycube that tiles the n-cube, and hence is topologically isotopic to a rep-tile. It follows that there is a rep-tile in the homotopy type of any finite CW complex. In addition to classifying rep-tiles in all dimensions up to isotopy, we also give new explicit constructions of rep-tiles, namely examples in the homotopy type of any finite bouquet of spheres.
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