Vertex operator algebras and representations of affine Lie algebras

The paper describes the theory of the toroidal Lie algebra, i.e. the Lie algebra of polynomial maps of a complex torus C x x C × into a finite-dimensional simple Lie algebra g. We describe the universal central extension I of this algebra and give an abstract presentation for it in terms of generato

We notice that for any positive integer k, the set of (1, 2)-specialized characters of level k standard A (1) 1 -modules is the same as the set of rescaled graded dimensions of the subspaces of level 2k + 1 standard A (2) 2 -modules that are vacuum spaces for the action of the principal Heisenberg

We study the twisted representations of code vertex operator algebras. For any inner automorphism g of a code VOA M , we compute the g-twisted modules of D M by using the theory of induced modules. We also show that M is g-rational if g is an inner automorphism.

Presented here is a construction of certain bases of basic representations for classical affine Lie algebras. The starting point is a ‫-ޚ‬grading ᒄ s ᒄ q ᒄ q ᒄ y1 0 1 of a classical Lie algebra ᒄ and the corresponding decomposition ᒄ s ᒄ q ᒄ q ˜˜ỹ 1 0 ᒄ of the affine Lie algebra ᒄ. By using a genera

We construct Lie algebras from vertex superalgebras and study their structure. They are sometimes generalized Kac᎐Moody algebras. In some special cases we can calculate the multiplicities of the roots.