Skew hook formula for \(d\)-complete posets via equivariant \(K\)-theory
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Publication:5971017
DOI10.5802/alco.54zbMath1417.05011arXiv1802.09748OpenAlexW2787956490MaRDI QIDQ5971017
Publication date: 6 August 2019
Published in: Algebraic Combinatorics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1802.09748
Exact enumeration problems, generating functions (05A15) Combinatorics of partially ordered sets (06A07) Equivariant (K)-theory (19L47) Classical problems, Schubert calculus (14N15)
Related Items (21)
Asymptotics for the number of standard tableaux of skew shape and for weighted lozenge tilings ⋮ Minuscule analogues of the plane partition periodicity conjecture of Cameron and Fon-Der-Flaass ⋮ Skew shape asymptotics, a case-based introduction ⋮ Hook formulas for skew shapes. IV: Increasing tableaux and factorial Grothendieck polynomials ⋮ The universal factorial Hall–Littlewood $P$- and $Q$-functions ⋮ Classifications of $\Gamma$-colored minuscule posets and $P$-minuscule Kac--Moody representations ⋮ Towards Landau-Ginzburg models for cominuscule spaces via the exceptional cominuscule family ⋮ Order structure of shapes of predominant integral weights and cylindric Young diagrams ⋮ Poset structure concerning cylindric diagrams ⋮ Classifications of \(\Gamma\)-colored \(d\)-complete posets and upper \(P\)-minuscule Borel representations ⋮ Proof of a conjecture of Morales-Pak-Panova on reverse plane partitions ⋮ \(d\)-complete posets: local structural axioms, properties, and equivalent definitions ⋮ Naruse hook formula for linear extensions of mobile posets ⋮ On random shifted standard Young tableaux and 132-avoiding sorting networks ⋮ Naruse hook formula for linear extensions of mobile posets ⋮ On the Okounkov-Olshanski formula for standard tableaux of skew shapes ⋮ Reverse plane partitions of skew staircase shapes and \(q\)-Euler numbers ⋮ Unique rectification in \(d\)-complete posets ⋮ Hook formulas for skew shapes. III: Multivariate and product formulas ⋮ Counting Linear Extensions of Posets with Determinants of Hook Lengths ⋮ A generalization of balanced tableaux and marriage problems with unique solutions
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