The Kostant form of U(sln+) and the Borel subalgebra of the Schur algebra S(n,r)

Abstract

Let An(K) be the Kostant form of U(sln+) and the monoid generated by the positive roots of sln. For each λ∈ (n,r) we construct a functor Fλ from the category of finitely generated -graded An(K)-modules to the category of finite dimensional S+(n,r)-modules, with the property that Fλ maps (minimal) projective resolutions of the one-dimensional An(K)-module KA to (minimal) projective resolutions of the simple S+(n,r)-module Kλ.