Item Infomation
| Title: |
| The Coven–Meyerowitz tiling conditions for 3 odd prime factors |
| Authors: |
| Izabella, Łaba Itay, Londner |
| Issue Date: |
| 2022 |
| Publisher: |
| Springer |
| Abstract: |
| It is well known that if a finite set A⊂Z tiles the integers by translations, then the translation set must be periodic, so that the tiling is equivalent to a factorization A⊕B=ZM of a finite cyclic group. We are interested in characterizing all finite sets A⊂Z that have this property. Coven and Meyerowitz (J Algebra 212:161–174, 1999) proposed conditions (T1), (T2) that are sufficient for A to tile, and necessary when the cardinality of A has at most two distinct prime factors. They also proved that (T1) holds for all finite tiles, regardless of size. |
| Description: |
| CC BY |
| URI: |
| https://link.springer.com/article/10.1007/s00222-022-01169-y https://dlib.phenikaa-uni.edu.vn/handle/PNK/7440 |
| Appears in Collections |
| OER - Khoa học Tự nhiên |
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