Flat bases of invariant polynomials and P̂-matrices of E7 and E8

Talamini, Vittorino

doi:10.1063/1.3272569

Cited by 10 publications

(15 citation statements)

References 27 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…, t n ∈ S G (V ) are called Saito flat coordinates. They were found explicitly by K. Saito et al in [46] for all the cases except E 7 , E 8 (for the latter cases see [36], [2], [51]). These coordinates play an important role in 2D topological field theory [10] and related theory of Frobenius manifolds developed by Dubrovin [11,12,13].…”

Section: Coxeter Arrangements and Saito Flat Coordinatesmentioning

confidence: 75%

$\vee$ -Systems, Holonomy Lie Algebras, and Logarithmic Vector Fields

Feigin

Веселов

2017

International Mathematics Research Notices

View full text Add to dashboard Cite

It is shown that the description of certain class of representations of the holonomy Lie algebra g ∆ associated to hyperplane arrangement ∆ is essentially equivalent to the classification of ∨-systems associated to ∆. The flat sections of the corresponding ∨-connection can be interpreted as vector fields, which are both logarithmic and gradient. We conjecture that the hyperplane arrangement of any ∨-system is free in Saito's sense and show this for all known ∨-systems and for a special class of ∨-systems called harmonic, which includes all Coxeter systems. In the irreducible Coxeter case the potentials of the corresponding gradient vector fields turn out to be Saito flat coordinates, or their one-parameter deformations. We give formulas for these deformations as well as for the potentials of the classical families of harmonic ∨-systems.

show abstract

Section: Coxeter Arrangements and Saito Flat Coordinatesmentioning

confidence: 75%

$\vee$ -Systems, Holonomy Lie Algebras, and Logarithmic Vector Fields

Feigin

Веселов

2017

International Mathematics Research Notices

View full text Add to dashboard Cite

show abstract

“…All the cases except W of type E 7 , E 8 were covered in the original paper [2]. The flat coordinates in the latter two cases were found recently both in [3] and in [4].…”

Section: Introductionmentioning

confidence: 86%

“…M.F. is very grateful to Y. Burman for stimulating discussions particularly in the beginning of the work, and to I. Strachan for useful discussions and for pointing out the paper [4]. M.F.…”

mentioning

confidence: 96%

Singular polynomials from orbit spaces

Feigin¹,

Silantyev²

2012

Compositio Math.

View full text Add to dashboard Cite

We consider the polynomial representation S(V * ) of the rational Cherednik algebra H c (W ) associated to a finite Coxeter group W at constant parameter c. We show that for any degree d of W and m ∈ N the space S(V * ) contains a single copy of the reflection representation V of W spanned by the homogeneous singular polynomials of degree d − 1 + hm, where h is the Coxeter number of W ; these polynomials generate an H c (W ) submodule with the parameter c = (d − 1)/h + m. We express these singular polynomials through the Saito polynomials that are flat coordinates of the Saito metric on the orbit space V /W . We also show that this exhausts all the singular polynomials in the isotypic component of the reflection representation V for any constant parameter c. MSC(2010): 16G99, 53D45

show abstract

“…. , d 7 ) = (2,6,8,10,12,14,18) are the degrees of the basic invariant polynomials of E 7 . (All the degrees are even, so it would be sufficient in Eq.…”

Section: Canonical Basis Of Invariant Polynomials For Ementioning

confidence: 99%

Canonical bases of invariant polynomials for the irreducible reflection groups of types E6, E7, and E8

Talamini

2018

Journal of Algebra

Self Cite

View full text Add to dashboard Cite

Given a rank n irreducible finite reflection group W , the W -invariant polynomial functions defined in R n can be written as polynomials of n algebraically independent homogeneous polynomial functions, p 1 (x), . . . , p n (x), called basic invariant polynomials. Their degrees are well known and typical of the given group W . The polynomial p 1 (x) has the lowest degree, equal to 2. It has been proved that it is possible to choose all the other n − 1 basic invariant polynomials in such a way that they satisfy a certain system of differential equations, including the Laplace equations △p a (x) = 0, a = 2, . . . , n, and so are harmonic functions. Bases of this kind are called canonical. Explicit formulas for canonical bases of invariant polynomials have been found for all irreducible finite reflection groups, except for those of types E 6 , E 7 and E 8 . Those for the groups of types E 6 , E 7 and E 8 are determined in this article.

show abstract

Flat bases of invariant polynomials and P̂-matrices of E7 and E8

Cited by 10 publications

References 27 publications

$\vee$ -Systems, Holonomy Lie Algebras, and Logarithmic Vector Fields

$\vee$ -Systems, Holonomy Lie Algebras, and Logarithmic Vector Fields

Singular polynomials from orbit spaces

Canonical bases of invariant polynomials for the irreducible reflection groups of types E6, E7, and E8

Contact Info

Product

Resources

About