Stability of the Chari-Loktev bases for local Weyl modules of   $\mathfrak{sl}_{r+1}[t]$

B. Ravinder

arXiv:1612.01484·math.RT·October 16, 2018·2 cites

Stability of the Chari-Loktev bases for local Weyl modules of $\mathfrak{sl}_{r+1}[t]$

B. Ravinder

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TL;DR

This paper proves the stability of Chari-Loktev bases for local Weyl modules of rak{sl}_{r+1}[t], confirming a conjecture and enabling the construction of bases for level one affine Lie algebra representations.

Contribution

It establishes the stability of Chari-Loktev bases under module inclusions, advancing understanding of their structure and applications in affine Lie algebra representations.

Findings

01

Proved stability of Chari-Loktev bases for local Weyl modules

02

Confirmed conjecture from previous work

03

Constructed bases for level one affine Lie algebra representations

Abstract

We prove stability of the Chari-Loktev bases with respect to the inclusions of local Weyl modules of the current algebra $sl_{r + 1} [t]$ . This is conjectured in \cite{RRV2} and the $r = 1$ case is proved in \cite{RRV1}. Local Weyl modules being known to be Demazure submodules in the level one representations of the affine Lie algebra $sl_{r + 1}$ , we obtain, by passage to the direct limit, bases for the level one representations themselves.

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Taxonomy

TopicsAlgebraic structures and combinatorial models · Advanced Algebra and Geometry · Nonlinear Waves and Solitons