On the hyperalgebra of the loop algebra gln

Abstract

Let U Z(gln) be the Garland integral form of U(gln) introduced by Garland Ga, where U(gln) is the universal enveloping algebra of gln. Using Ringel--Hall algebras, a certain integral form U Z(gln) of U(gln) was constructed in Fu13. We prove that the Garland integral form U Z(gln) coincides with U Z(gln). Let k be a commutative ring with unity and let U k(gln)= U Z(gln) k. For h≥ 1, we use Ringel--Hall algebras to construct a certain subalgebra, denoted by u\!\!(n)h, of U k(gln). The algebra u\!\!(n)h is the affine analogue of u(gln)h, where u(gln)h is a certain subalgebra of the hyperalgebra associated with gln introduced by Humhpreys Hum. The algebra u(gln)h plays an important role in the modular representation theory of gln. In this paper we give a realization of u\!\!(n)h using affine Schur algebras.