Category O for the Lie algebra of vector fields on the line

Abstract

Let W be the Lie algebra of vector fields on the line. Via computing extensions between all simple modules in the category O, we give the block decomposition of O, and show that the representation type of each block of O is wild using the Ext-quiver. Each block of O has infinite simple objects. This result is very different from that of O for complex semisimple Lie algebras. To find a connection between O and the module category over some associative algebra, we define a subalgebra H1 of U(b). We give an exact functor from O to the category of finite dimensional modules over H1. We also construct new simple W-modules from Weyl modules and modules over the Borel subalgebra b of W.