Local Systems on Classical Nilpotent Orbits and Maximal Length Elements
Abstract
It is known that there is a bijection between dominant weights of a complex reductive Lie group G and the set NO,r whose elements are of the form (O,), where O is a nilpotent orbit and is an irreducible, algebraic representation of the stabilizer group Ge of an element e in the nilpotent orbit O. We would like to study the above bijection when G is classical and corresponds to a local system of O. In particular, we will prove Conjecture 3.1 in AS and Conjecture 7.4' in Ac2 in the classical setting.
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