BLM realization for U Z(gln)

Abstract

In 1990, Beilinson-Lusztig-MacPherson (BLM) discovered a realization [5.7]BLM for quantum gln via a geometric setting of quantum Schur algebras. We will generailze their result to the classical affine case. More precisely, we first use Ringel-Hall algebras to construct an integral form U Z(gln) of U(gln), where U(gln) is the universal enveloping algebra of the loop algebra gln:=gln( Q) Q[t,t-1]. We then establish the stabilization property of multiplication for the classical affine Schur algebras. This stabilization property leads to the BLM realization of U(gln) and U Z(gln). In particular, we conclude that U Z(gln) is a Z-Hopf subalgebra of U(gln). As a bonus, this method leads to an explicit Z-basis for U Z(gln), and it yields explicit multiplication formulas between generators and basis elements for U Z(gln). As an application, we will prove that the natural algebra homomorphism from U Z(gln) to the affine Schur algebra over Z is surjective.