Jantzen filtration of Weyl modules, product of Young symmetrizers and denominator of Young's seminormal basis

Abstract

Let G be a connected reductive algebraic group over an algebraically closed field of characteristic p>0, (λ) denote the Weyl module of G of highest weight λ and λ,μ:(λ+μ) (λ)(μ) be the canonical G-morphism. We study the split condition for λ,μ over Z(p), and apply this as an approach to compare the Jantzen filtrations of the Weyl modules (λ) and (λ+μ). In the case when G is of type A, we show that the split condition is closely related to the product of certain Young symmetrizers and, under some mild conditions, is further characterized by the denominator of a certain Young's seminormal basis vector. We obtain explicit formulas for the split condition in some cases.