Antichains in weight posets associated with gradings of simple Lie algebras

Abstract

For a reductive Lie algebra h and a simple finite-dimensional h-module V, the set of weights of V, P(V), has a natural poset structure. We consider antichains in the weight poset P(V) and a certain operator X acting on antichains. Eventually, we impose stronger constraints on ( h,V) and stick to the case in which h and V are associated with a Z-grading of a simple Lie algebra g. Then V is a weight multiplicity free h-module and P(V) can be regarded as a subposet of +, where is the root system of g. Our goal is to demonstrate that antichains in the weight posets associated with Z-gradings of g exhibit many good properties similar to those of + that are observed earlier in arXiv: math.CO 0711.3353 (=Ref. [14] in the text).