Fermionic formulas for (k, 3)-admissible configurations
arXiv:math/0212347
Abstract
We obtain the fermionic formulas for the characters of (k, r)-admissible configurations in the case of r=2 and r=3. This combinatorial object appears as a label of a basis of certain subspace $W(Î)$ of level-$k$ integrable highest weight module of $\hat{sl}_{r}$. The dual space of $W(Î)$ is embedded into the space of symmetric polynomials. We introduce a filtration on this space and determine the components of the associated graded space explicitly by using vertex operators. This implies a fermionic formula for the character of $W(Î)$.
30 pages