Schubert Class and cyclotomic nilHecke algebras

Abstract

Let , n be positive integers such that ≥ n. Let Gn, be the Grassmannian which consists of the set of n-dimensional subspaces of C. There is a Z-graded algebra isomorphism between the cohomology H*(Gn,,Z) of Gn, and a natural Z-form B of the Z-graded basic algebra of the type A cyclotomic nilHecke algebra H,n(0)=1,·s,n-1,y1,·s,yn. In this paper, we show that the isomorphism can be chosen such that the image of each (geometrically defined) Schubert class (a1,·s,an) coincides with the basis element bλ constructed by Jun Hu and Xinfeng Liang by purely algebraic method, where 0≤ a1≤ a2≤·s≤ an≤ -n with ai∈Z for each i, λ is the -multipartition of n associated to (+1-(an+n), +1-(an-1+n-1),·s,+1-(a1+1)). A similar correspondence between the Schubert class basis of the cohomology of the Grassmannian G-n, and the bλ's basis of the natural Z-form B of the Z-graded basic algebra of H,n(0) is also obtained. As an application, we obtain a second version of Giambelli formula for Schubert classes.