Combinatorial bases of Feigin–Stoyanovsky's type subspaces of higher-level standard sl˜(ℓ+1,C)-modules

AbstractLet g˜ be an affine Lie algebra of the type Aℓ(1). We find a combinatorial basis of Feigin–Stoyanovsky's type subspace W(Λ) given in terms of difference and initial conditions. Linear independence of the generating set is proved inductively by using coefficients of intertwining operators. A basis of the standard g˜-module L(Λ) is obtained as an “inductive limit” of the basis of W(Λ)