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