Generating sets of standard modules for D4(1)
Abstract
Let g be an affine Lie algebra of type D4(1) and L() its standard module of level k with highest weight vector v. We define Feigin--Stoyanovsky's type subspace as W()=U( g1)\,v, where g= g-1 g0 g1 is a Z-gradation of g associated with a Z-gradation g= g-1 g0 g1. Using vertex operator relations, we reduce the Poincar\'e--Birkhoff--Witt spanning set of W(), and describe it in terms of difference and initial conditions. The spanning set of the whole standard module L() can be obtained as a limit of the spanning set for W().
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