Twisted vertex representations and spin characters

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.

The finite-dimensional irreducible representations of the Yangian of ~[2 are parametrized by their highest weights, which are monic polynomials in one variable. In this paper, we give a formula for the character of such a representation which depends only on its highest weight, and is an analogue of

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