BLM realization for ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$

Details BLM realization for ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$ BLM realization for ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$

2012-04-14

arxiv.org/abs/1204.3142v1

Mathematics

Representation Theory

33 pages

Scientific paper

In 1990, Beilinson-Lusztig-MacPherson (BLM) discovered a realization \cite[5.7]{BLM} for quantum $\frak{gl}_n$ 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 ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$ of ${\mathcal U}(\hat{\frak{gl}}_n)$, where ${\mathcal U}(\hat{\frak{gl}}_n)$ is the universal enveloping algebra of the loop algebra $\hat{\frak{gl}}_n:=\frak{gl}_n(\mathbb Q)\otimes\mathbb Q[t,t^{-1}]$. We then establish the stabilization property of multiplication for the classical affine Schur algebras. This stabilization property leads to the BLM realization of ${\mathcal U}(\hat{\frak{gl}}_n)$ and ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$. In particular, we conclude that ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$ is a $\mathbb Z$-Hopf subalgebra of ${\mathcal U}(\hat{\frak{gl}}_n)$. As a bonus, this method leads to an explicit $\mathbb Z$-basis for ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$, and it yields explicit multiplication formulas between generators and basis elements for ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$. As an application, we will prove that the natural algebra homomorphism from ${\mathcal U}_{\mathbb Z}(\hat{\frak{gl}}_n)$ to the affine Schur algebra over $\mathbb Z$ is surjective.

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