Adapted pairs in type A and regular nilpotent elements

Abstract

Let g be a simple Lie algebra over an algebraically closed field k of characteristic zero and G its adjoint group. Let q be a biparabolic subalgebra of g. The algebra Sy( q) of semi-invariants on q* is polynomial in most cases, in particular when g is simple of type A or C. On the other hand q admits a canonical truncation q such that Sy( q)=Sy( q)=Y( q) where Y( q) denotes the algebra of invariant functions on q*. An adapted pair for q is a pair (h,\,η)∈ q× q* such that η is regular and (ad\,h)η=-η. In a previous paper of A. Joseph (2008) adapted pairs for every truncated biparabolic subalgebra q of a simple Lie algebra g of type A were constructed and then provide Weierstrass sections for Y( q) in q*. These latter are linear subvarieties η+V of q* such that the restriction map induces an algebra isomorphism of Y( q) onto the algebra of regular functions on η+V. Here we show that for each of the adapted pairs (h,\,η) constructed in the paper mentioned above one can express η as the image of a regular nilpotent element y of g* under the restriction to q. Since y must be a G translate of the standard regular nilpotent element defined in terms of the already chosen set π of simple roots, one may attach to y a unique element of the Weyl group. Ultimately one can then hope to be able to describe adapted pairs (in general) through the Weyl group.