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Conjugacy action, induced representations and the Steinberg square for simple groups of Lie type - MaRDI portal

Conjugacy action, induced representations and the Steinberg square for simple groups of Lie type

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Publication:4923031

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DOI10.1112/plms/pds062zbMath1372.20017arXiv1209.1768OpenAlexW1986361427MaRDI QIDQ4923031

Gerhard Heide, Jan Saxl, Pham Hũ'u Tiêp, Alexander E. Zalesskij

Publication date: 5 June 2013

Published in: Proceedings of the London Mathematical Society (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1209.1768

Mathematics Subject Classification ID

Ordinary representations and characters (20C15) Representation theory for linear algebraic groups (20G05) Simple groups: alternating groups and groups of Lie type (20D06) Representations of finite groups of Lie type (20C33)

Related Items (19)

Singer torus in irreducible representations of \(\mathrm{GL}(n,q)\) ⋮ The conjugacy action of \(S_n\) and modules induced from centralisers ⋮ Critical classes, Kronecker products of spin characters, and the Saxl conjecture ⋮ On conjugacy classes of \(S_{n}\) containing all irreducibles ⋮ A tensor-cube version of the Saxl conjecture ⋮ Covering and growth for group subsets and representations ⋮ Splitting Kronecker squares, 2-decomposition numbers, Catalan combinatorics, and the Saxl conjecture ⋮ On the largest Kronecker and Littlewood-Richardson coefficients ⋮ Covering \(\mathsf{Irrep}(S_n)\) with tensor products and powers ⋮ Kronecker products, characters, partitions, and the tensor square conjectures ⋮ Lie theory of finite simple groups and the Roth property ⋮ In memoriam: Christine Bessenrodt (1958--2022) ⋮ Bounds on the largest Kronecker and induced multiplicities of finite groups ⋮ On the diameters of McKay graphs for finite simple groups ⋮ Entropic order parameters for the phases of QFT ⋮ Real ordinary characters and real Brauer characters ⋮ McKay graphs for alternating and classical groups ⋮ Kronecker positivity and 2-modular representation theory ⋮ Tensor quasi-random groups

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