On the Stanley–Stembridge conjecture A service of the NDSU Department of Mathematics, in association with the American Mathematical Society. Tatsuyuki Hikita. MathSciNet. Ph. D. Kyoto University
Tatsuyuki Hikita posted a preprint on Octopurporting to prove Problem 21, the Stanley–Stembridge conjecture about e-positivity of chromatic I will explain how to find a probability theoretic formula for the e-coefficients of chromatic quasisymmetric functions of unit interval Abstract: Tatsuyuki Hikita recently proved the Stanley–Stembridge conjecture using probabilistic methods, showing that the chromatic
HIKITA, Tatsuyuki Tatsuyuki Hikita - The Mathematics Genealogy Project Affine Springer fibers of type A and combinatorics of diagonal coinvariants. Author links open overlay panel. Tatsuyuki Hikita. Show more. Add to Mendeley.
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Potential Proof of the Stanley-Stembridge Conjecture : r/math Title:Non-toric examples of elliptic canonical bases I. Authors:Tatsuyuki Hikita From: Tatsuyuki Hikita [view email] [v1] Wed, 16 Oct 2024 17:
co.combinatorics - Status of the Stanley–Stembridge conjecture 201 votes, 14 comments. A few days ago, Tatsuyuki Hikita posted a paper on ArXiV that claims to prove the Stanley-Stembridge conjecture…
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AlCoVE: an Algebraic Combinatorics Virtual Expedition Tatsuyuki Hikita, RIMS, Kyoto University; Byung-Hak Hwang, Korea Institute for Advanced Study; Yuhan Jiang, Harvard University; Lukas Kühne Non-toric examples of elliptic canonical bases I
Séminaire Lotharingien de Combinatoire, 93B.31 (2025), 12 pp. Tatsuyuki Hikita. On the Stanley-Stembridge Conjecture. Abstract. Tatsuyuki Hikita. RIMS. 2025 07/24. The 37th International Conference on Formal Power Series and. Algebraic Combinatorics. Tatsuyuki Hikita (RIMS). Stanley A proof of the Stanley–Stembridge conjecture by Tatsuyuki Hikita
Tatsuyuki Hikita is working on geometric representation theory. Especially, he is interested in certain duality called symplectic duality. Affine Springer fibers of type A and combinatorics of diagonal