Details
| Originalsprache | Englisch |
|---|---|
| Aufsatznummer | 107702 |
| Fachzeitschrift | Advances in Mathematics |
| Jahrgang | 383 |
| Ausgabenummer | 383 |
| Frühes Online-Datum | 24 März 2021 |
| Publikationsstatus | Veröffentlicht - 4 Juni 2021 |
| Extern publiziert | Ja |
Abstract
Let A be a Coxeter arrangement of rank ℓ. In 1987 Orlik, Solomon and Terao conjectured that for every 1≤d≤ℓ, the first d exponents of A – when listed in increasing order – are realized as the exponents of a free restriction of A to some intersection of reflecting hyperplanes of A of dimension d. This conjecture does follow from rather extensive case-by-case studies by Orlik and Terao from 1992 and 1993, where they show that all restrictions of Coxeter arrangements are free. We call a general free arrangement with this natural property involving their free restrictions accurate. In this paper we initialize their systematic study. Our principal result shows that MAT-free arrangements, a notion recently introduced by Cuntz and Mücksch, are accurate. This theorem in turn directly implies this special property for all ideal subarrangements of Weyl arrangements. In particular, this gives a new, simpler and uniform proof of the aforementioned conjecture of Orlik, Solomon and Terao for Weyl arrangements which is free of any case-by-case considerations. Another application of a slightly more general formulation of our main theorem shows that extended Catalan arrangements, extended Shi arrangements, and ideal-Shi arrangements share this property as well. We also study arrangements that satisfy a slightly weaker condition, called almost accurate arrangements, where we simply disregard the ordering of the exponents involved. This property in turn is implied by many well established concepts of freeness such as supersolvability and divisional freeness.
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in: Advances in Mathematics, Jahrgang 383, Nr. 383, 107702, 04.06.2021.
Publikation: Beitrag in Fachzeitschrift › Artikel › Forschung › Peer-Review
}
TY - JOUR
T1 - Accurate arrangements
AU - Mücksch, Paul
AU - Röhrle, Gerhard
PY - 2021/6/4
Y1 - 2021/6/4
N2 - Let A be a Coxeter arrangement of rank ℓ. In 1987 Orlik, Solomon and Terao conjectured that for every 1≤d≤ℓ, the first d exponents of A – when listed in increasing order – are realized as the exponents of a free restriction of A to some intersection of reflecting hyperplanes of A of dimension d. This conjecture does follow from rather extensive case-by-case studies by Orlik and Terao from 1992 and 1993, where they show that all restrictions of Coxeter arrangements are free. We call a general free arrangement with this natural property involving their free restrictions accurate. In this paper we initialize their systematic study. Our principal result shows that MAT-free arrangements, a notion recently introduced by Cuntz and Mücksch, are accurate. This theorem in turn directly implies this special property for all ideal subarrangements of Weyl arrangements. In particular, this gives a new, simpler and uniform proof of the aforementioned conjecture of Orlik, Solomon and Terao for Weyl arrangements which is free of any case-by-case considerations. Another application of a slightly more general formulation of our main theorem shows that extended Catalan arrangements, extended Shi arrangements, and ideal-Shi arrangements share this property as well. We also study arrangements that satisfy a slightly weaker condition, called almost accurate arrangements, where we simply disregard the ordering of the exponents involved. This property in turn is implied by many well established concepts of freeness such as supersolvability and divisional freeness.
AB - Let A be a Coxeter arrangement of rank ℓ. In 1987 Orlik, Solomon and Terao conjectured that for every 1≤d≤ℓ, the first d exponents of A – when listed in increasing order – are realized as the exponents of a free restriction of A to some intersection of reflecting hyperplanes of A of dimension d. This conjecture does follow from rather extensive case-by-case studies by Orlik and Terao from 1992 and 1993, where they show that all restrictions of Coxeter arrangements are free. We call a general free arrangement with this natural property involving their free restrictions accurate. In this paper we initialize their systematic study. Our principal result shows that MAT-free arrangements, a notion recently introduced by Cuntz and Mücksch, are accurate. This theorem in turn directly implies this special property for all ideal subarrangements of Weyl arrangements. In particular, this gives a new, simpler and uniform proof of the aforementioned conjecture of Orlik, Solomon and Terao for Weyl arrangements which is free of any case-by-case considerations. Another application of a slightly more general formulation of our main theorem shows that extended Catalan arrangements, extended Shi arrangements, and ideal-Shi arrangements share this property as well. We also study arrangements that satisfy a slightly weaker condition, called almost accurate arrangements, where we simply disregard the ordering of the exponents involved. This property in turn is implied by many well established concepts of freeness such as supersolvability and divisional freeness.
KW - Coxeter arrangements
KW - Extended Shi arrangements
KW - Free arrangements
KW - Ideal arrangements
KW - MAT-free arrangements
KW - Weyl arrangements
UR - http://www.scopus.com/inward/record.url?scp=85103339540&partnerID=8YFLogxK
U2 - 10.1016/j.aim.2021.107702
DO - 10.1016/j.aim.2021.107702
M3 - Article
VL - 383
JO - Advances in Mathematics
JF - Advances in Mathematics
SN - 0001-8708
IS - 383
M1 - 107702
ER -