On Kostant's conjecture for components of V() V()

Abstract

For a complex simple Lie algebra g or rank r, let be the half sum of positive roots and P(2)⊂ Rr be the convex hull of all dominant weights λ of the form λ=2-Σi=1r aiαi with ai∈ Z≥ 0 for 1≤ i≤ r. We show that if λ is a vertex of P(2), then V(λ) appears in V() V() with multiplicity one, proving partially (for the vertices of P(2)) a conjecture of Kostant describing components of V() V(). This result allows us to give an alternative proof for a weaker form of the conjecture (up to saturation factor) for any g. Further, using works of Knutson-Tau on the saturation property of slr+1, our results give an alternative proof of Kostant's conjecture in the particular case g=slr+1.