Level two standard Ãn-modules

In this paper we study the level two standard (i.e., irreducible integrable highest weight) modules for an affine Lie algebra \(D_{l+1}^{(2)}(l \geqslant 2)\). In particular, we give explicit constructions of these modules in the principal picture. 1994 Academic Press, Inc.

concerned with the construction of vertex operator representations of the affine Kac᎐Moody Lie algebras twisted by automorphisms in H whose restriction to a Cartan subalgebra is q1. These modules are indexed by the four cosets of the root lattice of type D in its dual. The final sections 4 n are dev

We introduce level modules and show that these form a natural class of modules over a polynomial ring. We prove that there exist compressed level modules, i.e., level modules with the expected maximal Hilbert function, given socle type and the number of generators. We also show how to use the theory