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2013
In this chapter we construct the Brauer character of a modular representation of G, which is a class function on the p-regular elements in G, and we develop its properties. In particular, we describe the decomposition homomorphism in terms of characters.
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In this chapter we construct the Brauer character of a modular representation of G, which is a class function on the p-regular elements in G, and we develop its properties. In particular, we describe the decomposition homomorphism in terms of characters.
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On p′-degree ℓ-brauer characters of ℓ-solvable groups
Journal of Algebra and its Applications, 2023Joan F. Tent
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Cuspidal Unipotent Classes and Cuspidal Brauer Characters
Journal of the London Mathematical Society, 1996Let \(G\) be a connected reductive group defined over the finite field with \(q\) elements. We assume that the centre of \(G\) is connected and that \(q\) is a power of a good prime for \(G\). In his theory of generalized Gelfand-Graev representations (GGGRs for short), \textit{N. Kawanaka} [Proc. Symp. Pure Math.
Geck, Meinolf, Malle, Gunter
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Super-Brauer characters and super-regular classes
Monatshefte für Mathematik, 2009zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Chen, Xiaoyou, Zeng, Jiwen
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Normal Sylow subgroups and monomial Brauer characters
Frontiers of Mathematics in China, 2021Xiaoyou Chen, L. Miao
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Brauer Characters Relative to a Normal Subgroup
Proceedings of the London Mathematical Society, 2000The paper under review concerns comparing representations of a finite group in characteristic \(p\) with those in characteristic zero. Let \(N\) be a normal \(p\)-subgroup of \(G\) and let \(G^0=\{x\in G\mid x_p\in N\}\). Let \(\text{cf}(G^-)\) denote the space of complex class functions of \(G\) defined on \(G^0\). If \(\chi\) is a complex irreducible
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Correspondences of Brauer characters and Sylow subgroup normalizers
, 2021Joan F. Tent
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Metal–Organic Framework-Based Hierarchically Porous Materials: Synthesis and Applications
Chemical Reviews, 2021Guorui Cai +2 more
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