Kvasi-invarianter för ändliga Coxeter-grupper och integrabla system
Forskningsprojekt, 2019 – 2022

To each finite Coxeter group W, Chalykh and Veselov associated a family of algebras consisting of what they called quasi-invariant polynomials, which interpolate between the algebra of all polynomials and the algebra of W-invariant polynomials. Despite being natural generalisations of invariants, quasi-invariants were introduced as late as 1990 and in the context of integrable systems.

Even though quasi-invariants are known have very nice algebraic properties, effective and explicit descriptions in terms of some form of generators are missing. The main aim of the project is to bridge this important gap, in particular by studying so-called m-harmonic-polynomials, conjectured by Feigin and Veselov (in 2002) to provide sets of free generators of the quasi-invariants over the invariants.

Applications to the, currently very active, area of exceptional orthogonal polynomials, the classical problem of describing the polynomials with given multiple roots with prescribed multiplicities, and to the theory of the fractional quantum Hall effect in two-dimensional electron systems will also be studied.

Deltagare

Martin Hallnäs (kontakt)

Chalmers, Matematiska vetenskaper, Analys och sannolikhetsteori

Andra projekt Forskning

Finansiering

Vetenskapsrådet (VR)

Projekt-id: 2018-04291
Finansierar Chalmers deltagande under 2019–2022

Andra projekt Projektinformation

Relaterade styrkeområden och infrastruktur

Grundläggande vetenskaper

Fundament

Publikationer

2024

Mer information

Projektet på Chalmers webb

https://www.chalmers.se/sv/projekt/Sidor/K...

Senast uppdaterat

2019-04-15

Kvasi-invarianter för ändliga Coxeter-grupper och integrabla system
Forskningsprojekt, 2019 – 2022

Deltagare

Martin Hallnäs (kontakt)

Finansiering

Vetenskapsrådet (VR)

Relaterade styrkeområden och infrastruktur

Grundläggande vetenskaper

Publikationer

Baxter Q-operator for the hyperbolic Calogero-Moser system

New Orthogonality Relations for Super-Jack Polynomials and an Associated Lassalle–Nekrasov Correspondence

Higher Order Deformed Elliptic Ruijsenaars Operators

From Kajihara’s transformation formula to deformed Macdonald–Ruijsenaars and Noumi–Sano operators

Quasi-invariant Hermite Polynomials and Lassalle-Nekrasov Correspondence

Joint Eigenfunctions for the Relativistic Calogero–Moser Hamiltonians of Hyperbolic Type. III. Factorized Asymptotics

Super-Macdonald Polynomials: Orthogonality and Hilbert Space Interpretation

Mer information

Projektet på Chalmers webb

Senast uppdaterat

Kvasi-invarianter för ändliga Coxeter-grupper och integrabla system Forskningsprojekt, 2019 – 2022

Deltagare

Martin Hallnäs (kontakt)

Finansiering

Vetenskapsrådet (VR)

Relaterade styrkeområden och infrastruktur

Grundläggande vetenskaper

Publikationer

Baxter Q-operator for the hyperbolic Calogero-Moser system

New Orthogonality Relations for Super-Jack Polynomials and an Associated Lassalle–Nekrasov Correspondence

Higher Order Deformed Elliptic Ruijsenaars Operators

From Kajihara’s transformation formula to deformed Macdonald–Ruijsenaars and Noumi–Sano operators

Quasi-invariant Hermite Polynomials and Lassalle-Nekrasov Correspondence

Joint Eigenfunctions for the Relativistic Calogero–Moser Hamiltonians of Hyperbolic Type. III. Factorized Asymptotics

Super-Macdonald Polynomials: Orthogonality and Hilbert Space Interpretation

Mer information

Projektet på Chalmers webb

Senast uppdaterat

Kvasi-invarianter för ändliga Coxeter-grupper och integrabla system
Forskningsprojekt, 2019 – 2022