Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$

Publikation: Bidrag til tidsskriftKonferenceartikelForskningfagfællebedømt

Standard

Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$. / Jakobsen, Hans Plesner.

I: Journal of Physics: Conference Series, Bind 1194, Nr. 1, 012055, 2019.

Publikation: Bidrag til tidsskriftKonferenceartikelForskningfagfællebedømt

Harvard

Jakobsen, HP 2019, 'Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$', Journal of Physics: Conference Series, bind 1194, nr. 1, 012055. https://doi.org/10.1088/1742-6596/1194/1/012055

APA

Jakobsen, H. P. (2019). Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$. Journal of Physics: Conference Series, 1194(1), [012055]. https://doi.org/10.1088/1742-6596/1194/1/012055

Vancouver

Jakobsen HP. Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$. Journal of Physics: Conference Series. 2019;1194(1). 012055. https://doi.org/10.1088/1742-6596/1194/1/012055

Author

Jakobsen, Hans Plesner. / Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$. I: Journal of Physics: Conference Series. 2019 ; Bind 1194, Nr. 1.

Bibtex

@inproceedings{d5fb4a7a65974ff6bbfc9d89acaaed55,
title = "Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$",
abstract = "We study homomorphisms between quantized generalized Verma modules M(Vλ) φλ,λ1→ M(Vλ1 ) for uq (su(n; n)). There is a natural notion of degree for such maps, and if the map is of degree k, we write φkλ,λ1. We examine when one can have a series of such homomorphisms φ1λn-1,λ n φ1λn-1,λ n ⋯ o φ1λ, λ1 = Detq, where Detq denotes the map M(Vλ)ϵ p → detq p ϵ 2 M(Vλn). If, classically, su(n; n)C = p ⊗(su(n) ⊗su(n) ⊗C) ⊗p+, then λ = (λL, λR,λ) and λn = (λL;λRλ+2). The answer is then that - must be one-sided in the sense that either λL = 0 or λR = 0 (non-exclusively). There are further demands on λ if we insist on Uq(gC) homomorphisms. However, it is also interesting to loosen this to considering only Uq (gC) homomorphisms, in which case the conditions on λ disappear. By duality, there result have implications on covariant quantized difierential operators. We finish by giving an explicit, though sketched, determination of the full set of Uq(gC) homomorphisms φ1λ, λ1. {\textcopyright} 2019 Published under licence by IOP Publishing Ltd.",
author = "Jakobsen, {Hans Plesner}",
year = "2019",
doi = "10.1088/1742-6596/1194/1/012055",
language = "English",
volume = "1194",
journal = "Journal of Physics: Conference Series",
issn = "1742-6588",
publisher = "Institute of Physics Publishing Ltd",
number = "1",
note = "32nd International Colloquium on Group Theoretical Methods in Physics, ICGTMP 2018 ; Conference date: 09-07-2019 Through 13-07-2019",

}

RIS

TY - GEN

T1 - Special classes of homomorphisms between generalized Verma modules for ${{\mathscr{U}}}_{q}(su(n,n))$

AU - Jakobsen, Hans Plesner

PY - 2019

Y1 - 2019

N2 - We study homomorphisms between quantized generalized Verma modules M(Vλ) φλ,λ1→ M(Vλ1 ) for uq (su(n; n)). There is a natural notion of degree for such maps, and if the map is of degree k, we write φkλ,λ1. We examine when one can have a series of such homomorphisms φ1λn-1,λ n φ1λn-1,λ n ⋯ o φ1λ, λ1 = Detq, where Detq denotes the map M(Vλ)ϵ p → detq p ϵ 2 M(Vλn). If, classically, su(n; n)C = p ⊗(su(n) ⊗su(n) ⊗C) ⊗p+, then λ = (λL, λR,λ) and λn = (λL;λRλ+2). The answer is then that - must be one-sided in the sense that either λL = 0 or λR = 0 (non-exclusively). There are further demands on λ if we insist on Uq(gC) homomorphisms. However, it is also interesting to loosen this to considering only Uq (gC) homomorphisms, in which case the conditions on λ disappear. By duality, there result have implications on covariant quantized difierential operators. We finish by giving an explicit, though sketched, determination of the full set of Uq(gC) homomorphisms φ1λ, λ1. © 2019 Published under licence by IOP Publishing Ltd.

AB - We study homomorphisms between quantized generalized Verma modules M(Vλ) φλ,λ1→ M(Vλ1 ) for uq (su(n; n)). There is a natural notion of degree for such maps, and if the map is of degree k, we write φkλ,λ1. We examine when one can have a series of such homomorphisms φ1λn-1,λ n φ1λn-1,λ n ⋯ o φ1λ, λ1 = Detq, where Detq denotes the map M(Vλ)ϵ p → detq p ϵ 2 M(Vλn). If, classically, su(n; n)C = p ⊗(su(n) ⊗su(n) ⊗C) ⊗p+, then λ = (λL, λR,λ) and λn = (λL;λRλ+2). The answer is then that - must be one-sided in the sense that either λL = 0 or λR = 0 (non-exclusively). There are further demands on λ if we insist on Uq(gC) homomorphisms. However, it is also interesting to loosen this to considering only Uq (gC) homomorphisms, in which case the conditions on λ disappear. By duality, there result have implications on covariant quantized difierential operators. We finish by giving an explicit, though sketched, determination of the full set of Uq(gC) homomorphisms φ1λ, λ1. © 2019 Published under licence by IOP Publishing Ltd.

U2 - 10.1088/1742-6596/1194/1/012055

DO - 10.1088/1742-6596/1194/1/012055

M3 - Conference article

VL - 1194

JO - Journal of Physics: Conference Series

JF - Journal of Physics: Conference Series

SN - 1742-6588

IS - 1

M1 - 012055

T2 - 32nd International Colloquium on Group Theoretical Methods in Physics, ICGTMP 2018

Y2 - 9 July 2019 through 13 July 2019

ER -

ID: 226877111