Principal Galois orders and Gelfand-Zeitlin modules

Hartwig, Jonas T.

doi:10.1016/j.aim.2019.106806

Cited by 19 publications

(38 citation statements)

References 27 publications

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“…In [FMO10] they showed that ι(W (π)) is a Galois order. In [Har20] it was further shown to be a principal Galois order. Here is the realization.…”

Section: Definition 123 ([Fo10]mentioning

confidence: 99%

“…They form a collection of algebras that contains many important examples including: generalized Weyl algebras defined independently by Bavula [Bav92] and Rosenberg [Ros95] in the early nineties, U (gl n ), shifted Yangians and finite W -algebras [FMO10], Coulomb branches [Web19], and U q (gl n ) [FH14]. Their structures and representations have been studied in [Fut+18], [FS18a], [Har20], and [MV18].…”

Section: Galois Ordersmentioning

confidence: 99%

“…We need the following data: (Λ, G, M ), where Λ is an integrally closed domain, G is a finite subgroup of Aut(Λ), and M is a submonoid of Aut(Λ). Additionally, this data adheres to the following assumptions from [Har20]:…”

Section: Galois Ordersmentioning

confidence: 99%

“…Definition 1.2.1 ( [Har20]). For any element X ∈ Frac(Λ)#M we define a Z-bilinear map from (Frac(Λ)#M ) × Frac(Λ) → Frac(Λ), called the evaluation of X at f for an element f ∈ Frac(Λ), by:…”

Section: Galois Ordersmentioning

confidence: 99%

“…In [Har20] it was shown that any (co-)principal Galois Γ-order is a Galois order in the sense of Definition 2.2.6.…”

Section: Definition 222 ([Fo10]mentioning

confidence: 99%

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A study of Galois and flag orders

Jauch¹

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Galois orders, introduced in 2010 by V. Futorny and S. Ovsienko, form a class of associative algebras that contain many important examples, such as the enveloping algebra of gl n (as well as its quantum deformation), generalized Weyl algebras, and shifted Yangians. The main motivation for introducing Galois orders is they provide a setting for studying certain infinite dimensional irreducible representations, called Gelfand-Tsetlin modules. Principal Galois orders, defined by J. Hartwig in 2017, are Galois orders with an extra property, which makes them easier to study. All of the mentioned examples are principal Galois orders. In 2019, B. Webster defined principal flag orders which are Morita equivalent to principal Galois orders and further simplifies their study.The purpose of this dissertation is twofold:(1) To introduce a new example of a Galois order, A (gl n ), which is an extension of the enveloping algebra of gl n such that the "Weyl group" of A (gl n ) is the alternating group;(2) To describe some techniques to study such objects including tensor products and morphisms between standard flag orders with conjectured application to the orthogonal Lie algebra.

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“…In [FMO10] they showed that ι(W (π)) is a Galois order. In [Har20] it was further shown to be a principal Galois order. Here is the realization.…”

Section: Definition 123 ([Fo10]mentioning

confidence: 99%