Rational Cherednik algebras and Schubert cells

Bellamy, Gwyn

doi:10.1007/s10468-018-9831-3

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Rational Cherednik algebras and Schubert cells

Bellamy, G. (2019). Rational Cherednik algebras and Schubert cells. Algebras and Representation Theory, 22(6), 1533-1567. doi:10.1007/s10468-018-9831-3.

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Bellamy, Gwyn¹, Author

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1Max Planck Institute for Mathematics, Max Planck Society, ou_3029201

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Free keywords: Mathematics, Representation Theory

Abstract: The representation theory of rational Cherednik algebras of type A at t=0 gives rise, by considering supports, to a natural family of smooth Lagrangian subvarieties of the Calogero-Moser space. The goal of this article is to make precise the relationship between these Lagrangians and Schubert cells in the adelic Grassmannian. In order to do this we show that the isomorphism, as constructed by Etingof and Ginzburg, from the spectrum of the centre of the rational Cherednik algebra to the Calogero-Moser space is compatible with the
factorization property of both of these spaces. As a consequence, the space of homomorphisms between certain representations of the rational Cherednik algebra can be identified with functions on the intersection Schubert cells.

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Language(s): eng - English

Dates: Date issued: 2019

Publication Status: Issued

Pages: 35

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Rev. Type: Peer

Identifiers: arXiv: 1210.3870
URI: http://arxiv.org/abs/1210.3870
DOI: 10.1007/s10468-018-9831-3

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Title: Algebras and Representation Theory

Abbreviation : Algebr. Represent. Theory

Source Genre: Journal

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Publ. Info: Springer

Pages: - Volume / Issue: 22 (6) Sequence Number: - Start / End Page: 1533 - 1567 Identifier: -