Computes graded W-characters of Lusztig varieties over regular semisimple loci and conjectures positive unimodal coefficients for Springer-decomposed Laurent polynomials α_ψ,G^z when ψ is type-A inflated, while proving partial triangularity and Levi stability.
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2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
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Applies Gaetz-Gao result to describe a set of permutations w in S_n whose modified Kazhdan-Lusztig basis elements have no reversal factorization into maximal parabolic elements.
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Haiman's Conjecture and Springer's Representations
Computes graded W-characters of Lusztig varieties over regular semisimple loci and conjectures positive unimodal coefficients for Springer-decomposed Laurent polynomials α_ψ,G^z when ψ is type-A inflated, while proving partial triangularity and Levi stability.
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On Kazhdan--Lusztig basis elements having no reversal factorization
Applies Gaetz-Gao result to describe a set of permutations w in S_n whose modified Kazhdan-Lusztig basis elements have no reversal factorization into maximal parabolic elements.