Littlewood-Richardson Coefficient, Springer Fibers and the Annihilator Varieties of Induced Representations

Abstract

For G=GL(n,C) and a parabolic subgroup P=LN with a two-block Levi subgroup L=GL(n1)× GL(n2), the space G· (O+n), where O is a nilpotent orbit of l, is a union of nilpotent orbits of g. In the first part of our main theorem, we use the geometric Sakate equivalence to prove that O'⊂ G· (O+n) if and only if some Littlewood-Richardson coefficients do not vanish. The second part of our main theorem describes the geometry of the space Op, which is an important space to study for the Whittaker supports and annihilator varieties of representations of G.