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Bibliographic Details
Main Authors: Gatto, Letterio, Yousofzadeh, Malihe
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.15152
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author Gatto, Letterio
Yousofzadeh, Malihe
author_facet Gatto, Letterio
Yousofzadeh, Malihe
contents The Clifford algebra of the endomorphisms of the exterior algebra of a countably dimensional vector space induces natural bosonic shadows, i.e. families of linear maps between the cohomologies of complex grassmannians. The main result of this paper is to provide a determinantal formula expressing generating functions of such endomorphisms unifying several classical special cases. For example the action over a point recovers the Jacobi-Trudy formula in the theory of symmetric functions or the Giambelli's one in classical Schubert calculus, whereas the action of degree preserving endomorphisms take into account the finite type version of the Date-Jimbo-Kashiwara-Miwa bosonic vertex operator representation of the Lie algebra $gl(\infty)$. The fermionic actions on (finite type) bosonic spaces is described in terms of the classical theory of symmetric functions. The main guiding principle is the fact that the exterior algebra is a (non irreducible) representation of the ring of symmetric functions, which is the way we use to spell the ``finite type'' Boson-Fermion correspondence.
format Preprint
id arxiv_https___arxiv_org_abs_2410_15152
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Action of free fermions on Symmetric Functions
Gatto, Letterio
Yousofzadeh, Malihe
Representation Theory
Mathematical Physics
Algebraic Geometry
Combinatorics
15A75, 14M15, 17B69
The Clifford algebra of the endomorphisms of the exterior algebra of a countably dimensional vector space induces natural bosonic shadows, i.e. families of linear maps between the cohomologies of complex grassmannians. The main result of this paper is to provide a determinantal formula expressing generating functions of such endomorphisms unifying several classical special cases. For example the action over a point recovers the Jacobi-Trudy formula in the theory of symmetric functions or the Giambelli's one in classical Schubert calculus, whereas the action of degree preserving endomorphisms take into account the finite type version of the Date-Jimbo-Kashiwara-Miwa bosonic vertex operator representation of the Lie algebra $gl(\infty)$. The fermionic actions on (finite type) bosonic spaces is described in terms of the classical theory of symmetric functions. The main guiding principle is the fact that the exterior algebra is a (non irreducible) representation of the ring of symmetric functions, which is the way we use to spell the ``finite type'' Boson-Fermion correspondence.
title Action of free fermions on Symmetric Functions
topic Representation Theory
Mathematical Physics
Algebraic Geometry
Combinatorics
15A75, 14M15, 17B69
url https://arxiv.org/abs/2410.15152