Salvato in:
Dettagli Bibliografici
Autori principali: Buachalla, Réamonn Ó, Somberg, Petr
Natura: Preprint
Pubblicazione: 2023
Soggetti:
Accesso online:https://arxiv.org/abs/2312.13493
Tags: Aggiungi Tag
Nessun Tag, puoi essere il primo ad aggiungerne!!
_version_ 1866913790110466048
author Buachalla, Réamonn Ó
Somberg, Petr
author_facet Buachalla, Réamonn Ó
Somberg, Petr
contents For the Drinfeld-Jimbo quantum enveloping algebra $U_q(\frak{sl}_{n+1})$, we show that the span of Lusztig's positive root vectors, with respect to Littlemann's nice reduced decompositions of the longest element of the Weyl group, form quantum tangent spaces for the full quantum flag manifold $\mathcal{O}_q(\mathrm{F}_{n+1})$. The associated differential calculi are direct $q$-deformations of the anti-holomorphic Dolbeault complex of the classical full flag manifold $\mathrm{F}_{n+1}$. As an application we establish a quantum Borel-Weil theorem for the $A_n$-series full quantum flag manifold, giving a noncommutative differential geometric realisation of all the finite-dimensional type-$1$ irreducible representations of $U_q(\frak{sl}_{n+1})$. Restricting this differential calculus to the quantum Grassmannians is shown to reproduce the celebrated Heckenberger-Kolb anti-holomorphic Dolbeault complex. Lusztig's positive root vectors for non-nice decompositions of the longest element of the Weyl group are examined for low orders, and are exhibited to either not give tangents spaces, or to produce differential calculi of non-classical dimension.
format Preprint
id arxiv_https___arxiv_org_abs_2312_13493
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Lusztig's Quantum Root Vectors and a Dolbeault Complex for the A-Series Full Quantum Flag Manifolds
Buachalla, Réamonn Ó
Somberg, Petr
Quantum Algebra
For the Drinfeld-Jimbo quantum enveloping algebra $U_q(\frak{sl}_{n+1})$, we show that the span of Lusztig's positive root vectors, with respect to Littlemann's nice reduced decompositions of the longest element of the Weyl group, form quantum tangent spaces for the full quantum flag manifold $\mathcal{O}_q(\mathrm{F}_{n+1})$. The associated differential calculi are direct $q$-deformations of the anti-holomorphic Dolbeault complex of the classical full flag manifold $\mathrm{F}_{n+1}$. As an application we establish a quantum Borel-Weil theorem for the $A_n$-series full quantum flag manifold, giving a noncommutative differential geometric realisation of all the finite-dimensional type-$1$ irreducible representations of $U_q(\frak{sl}_{n+1})$. Restricting this differential calculus to the quantum Grassmannians is shown to reproduce the celebrated Heckenberger-Kolb anti-holomorphic Dolbeault complex. Lusztig's positive root vectors for non-nice decompositions of the longest element of the Weyl group are examined for low orders, and are exhibited to either not give tangents spaces, or to produce differential calculi of non-classical dimension.
title Lusztig's Quantum Root Vectors and a Dolbeault Complex for the A-Series Full Quantum Flag Manifolds
topic Quantum Algebra
url https://arxiv.org/abs/2312.13493