TY - JOUR
AB - A d-dimensional simplex S is called a k-reptile (or a k-reptile simplex) if it can be tiled by k simplices with disjoint interiors that are all mutually congruent and similar to S. For d = 2, triangular k-reptiles exist for all k of the form a^2, 3a^2 or a^2+b^2 and they have been completely characterized by Snover, Waiveris, and Williams. On the other hand, the only k-reptile simplices that are known for d ≥ 3, have k = m^d, where m is a positive integer. We substantially simplify the proof by Matoušek and the second author that for d = 3, k-reptile tetrahedra can exist only for k = m^3. We then prove a weaker analogue of this result for d = 4 by showing that four-dimensional k-reptile simplices can exist only for k = m^2.
AU - Kynčl, Jan
AU - Patakova, Zuzana
ID - 701
IS - 3
JF - The Electronic Journal of Combinatorics
SN - 10778926
TI - On the nonexistence of k reptile simplices in ℝ^3 and ℝ^4
VL - 24
ER -