Details
| Original language | English |
|---|---|
| Pages (from-to) | 1430-1449 |
| Number of pages | 20 |
| Journal | Discrete mathematics |
| Volume | 339 |
| Issue number | 5 |
| Publication status | Published - 6 May 2016 |
Abstract
In the category of free arrangements, inductively and recursively free arrangements are important. In particular, in the former, Terao's open problem asking whether freeness depends only on combinatorics is true. A long standing problem whether all free arrangements are recursively free or not was settled by the second author and Hoge very recently, by giving a free but non-recursively free plane arrangement consisting of 27 planes. In this paper, we construct free but non-recursively free plane arrangements consisting of 13 and 15 planes, and show that the example with 13 planes is the smallest in the sense of the cardinality of planes. In other words, all free plane arrangements consisting of at most 12 planes are recursively free. To show this, we completely classify all free plane arrangements in terms of inductive freeness and three exceptions when the number of planes is at most 12. Several properties of the 15 plane arrangement are proved by computer programs. Also, these two examples solve negatively a problem posed by Yoshinaga on the moduli spaces, (inductive) freeness and, rigidity of free arrangements.
Keywords
- Arrangement of lines, Moduli space, Recursively free
ASJC Scopus subject areas
- Mathematics(all)
- Theoretical Computer Science
- Mathematics(all)
- Discrete Mathematics and Combinatorics
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In: Discrete mathematics, Vol. 339, No. 5, 06.05.2016, p. 1430-1449.
Research output: Contribution to journal › Article › Research › peer review
}
TY - JOUR
T1 - Non-recursive freeness and non-rigidity
AU - Abe, T.
AU - Cuntz, M.
AU - Kawanoue, H.
AU - Nozawa, T.
N1 - Funding information: We are grateful to M. Yoshinaga for his helpful comments. We thank the referees for their thorough reading and making several comments. The first author’s work was partially supported by Japan Society for the Promotion of Science Grant-in-Aid for Young Scientists (B) , No. 24740012 . The third author’s work was partially supported by Japan Society for the Promotion of Science Grant-in-Aid for Young Scientists (B) , No. 23740016 .
PY - 2016/5/6
Y1 - 2016/5/6
N2 - In the category of free arrangements, inductively and recursively free arrangements are important. In particular, in the former, Terao's open problem asking whether freeness depends only on combinatorics is true. A long standing problem whether all free arrangements are recursively free or not was settled by the second author and Hoge very recently, by giving a free but non-recursively free plane arrangement consisting of 27 planes. In this paper, we construct free but non-recursively free plane arrangements consisting of 13 and 15 planes, and show that the example with 13 planes is the smallest in the sense of the cardinality of planes. In other words, all free plane arrangements consisting of at most 12 planes are recursively free. To show this, we completely classify all free plane arrangements in terms of inductive freeness and three exceptions when the number of planes is at most 12. Several properties of the 15 plane arrangement are proved by computer programs. Also, these two examples solve negatively a problem posed by Yoshinaga on the moduli spaces, (inductive) freeness and, rigidity of free arrangements.
AB - In the category of free arrangements, inductively and recursively free arrangements are important. In particular, in the former, Terao's open problem asking whether freeness depends only on combinatorics is true. A long standing problem whether all free arrangements are recursively free or not was settled by the second author and Hoge very recently, by giving a free but non-recursively free plane arrangement consisting of 27 planes. In this paper, we construct free but non-recursively free plane arrangements consisting of 13 and 15 planes, and show that the example with 13 planes is the smallest in the sense of the cardinality of planes. In other words, all free plane arrangements consisting of at most 12 planes are recursively free. To show this, we completely classify all free plane arrangements in terms of inductive freeness and three exceptions when the number of planes is at most 12. Several properties of the 15 plane arrangement are proved by computer programs. Also, these two examples solve negatively a problem posed by Yoshinaga on the moduli spaces, (inductive) freeness and, rigidity of free arrangements.
KW - Arrangement of lines
KW - Moduli space
KW - Recursively free
UR - http://www.scopus.com/inward/record.url?scp=84954071659&partnerID=8YFLogxK
U2 - 10.1016/j.disc.2015.12.017
DO - 10.1016/j.disc.2015.12.017
M3 - Article
AN - SCOPUS:84954071659
VL - 339
SP - 1430
EP - 1449
JO - Discrete mathematics
JF - Discrete mathematics
SN - 0012-365X
IS - 5
ER -