DOAJ Open Access 2014

The freeness of ideal subarrangements of Weyl arrangements

Takuro Abe Mohamed Barakat Michael Cuntz Torsten Hoge Hiroaki Terao

Lihat Sumber DOI

Abstrak

A Weyl arrangement is the arrangement defined by the root system of a finite Weyl group. When a set of positive roots is an ideal in the root poset, we call the corresponding arrangement an ideal subarrangement. Our main theorem asserts that any ideal subarrangement is a free arrangement and that its exponents are given by the dual partition of the height distribution, which was conjectured by Sommers-Tymoczko. In particular, when an ideal subarrangement is equal to the entire Weyl arrangement, our main theorem yields the celebrated formula by Shapiro, Steinberg, Kostant, and Macdonald. The proof of the main theorem is classification-free. It heavily depends on the theory of free arrangements and thus greatly differs from the earlier proofs of the formula.

Topik & Kata Kunci

Mathematics

Penulis (5)

Takuro Abe

Mohamed Barakat

Michael Cuntz

Torsten Hoge

Hiroaki Terao

Format Sitasi

APA MLA BibTeX

Abe, T., Barakat, M., Cuntz, M., Hoge, T., Terao, H. (2014). The freeness of ideal subarrangements of Weyl arrangements. https://doi.org/10.46298/dmtcs.2418

Akses Cepat

Lihat di Sumber doi.org/10.46298/dmtcs.2418

Informasi Jurnal

Tahun Terbit: 2014
Sumber Database: DOAJ
DOI: 10.46298/dmtcs.2418
Akses: Open Access ✓