使用Ribbon Right Trominoes平铺带间隙的矩形

P. Junius, V. Nitica
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引用次数: 3

摘要

我们证明,为了用带状直角三角形平铺,从长度为2的整数边的矩形中需要取出的最小单元数(间隙数)小于或等于4。如果矩形的边的长度至少为5,则间隙数小于或等于3。我们还证明,对于具有非平凡最小间隙数的矩形族,概率为1,平铺的唯一障碍来自着色不变量。这与简单连接区域的情况相反。对于这类区域,Conway和Lagarias发现了一个不遵循着色的平铺不变量。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Tiling Rectangles with Gaps by Ribbon Right Trominoes
We show that the least number of cells (the gap number) one needs to take out from a rectangle with integer sides of length at least 2 in order to be tiled by ribbon right trominoes is less than or equal to 4. If the sides of the rectangle are of length at least 5, then the gap number is less than or equal to 3. We also show that for the family of rectangles that have nontrivial minimal number of gaps, with probability 1, the only obstructions to tiling appear from coloring invariants. This is in contrast to what happens for simply connected regions. For that class of regions Conway and Lagarias found a tiling invariant that does not follow from coloring.
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来源期刊
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