The support of Kostant's weight multiplicity formula is an order ideal in the weak Bruhat order

Abstract

For integral weights λ and μ of a classical simple Lie algebra g, Kostant's weight multiplicity formula gives the multiplicity of the weight μ in the irreducible representation with highest weight λ, which we denote by m(λ,μ). Kostant's weight multiplicity formula is an alternating sum over the Weyl group of the Lie algebra whose terms are determined via a vector partition function. The Weyl alternation set A(λ,μ) is the set of elements of the Weyl group that contribute nontrivially to the multiplicity m(λ,μ). In this article, we prove that Weyl alternation sets are order ideals in the weak Bruhat order of the corresponding Weyl group. Specializing to the Lie algebra slr+1(C), we give a complete characterization of the Weyl alternation sets A(α,μ), where α is the highest root and μ is a negative root, answering a question of Harry posed in 2024. We also provide some enumerative results that pave the way for our future work, where we aim to prove Harry's conjecture that the q-analog of Kostant's weight multiplicity formula is mq(α,μ)=qr+j-i+1+qr+j-i-qj-i+1 when μ=-(αi+αi+1+·s+αj) is a negative root of slr+1(C).

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