In this book Professor Lusztig solves an interesting problem by entirely new methods: specifically, the use of cohomology of buildings and related complexes.
The book gives an explicit construction of one distinguished member, D(V), of the discrete series of GLn (Fq), where V is the n-dimensional F-vector space on which GLn(Fq) acts. This is a p-adic representation; more precisely D(V) is a free module of rank (q–1) (q2—1)…(qn-1—1) over the ring of Witt vectors WF of F.
In Chapter 1 the author studies the homology of partially ordered sets, and proves some vanishing theorems for the homology of some partially ordered sets associated to geometric structures. Chapter 2 is a study of the representation △ of the affine group over a finite field. In Chapter 3 D(V) is defined, and its restriction to parabolic subgroups is determined. In Chapter 4 the author computes the character of D(V), and shows how to obtain other members of the discrete series by applying Galois automorphisms to D(V). Applications are in Chapter 5. As one of the main applications of his study the author gives a precise analysis of a Brauer lifting of the standard representation of GLn(Fq).
George Lusztig
Discrete Series of GLn Over a Finite Field. (AM-81), Volume 81 [PDF ebook]
Discrete Series of GLn Over a Finite Field. (AM-81), Volume 81 [PDF ebook]
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Langue Anglais ● Format PDF ● Pages 104 ● ISBN 9781400881765 ● Taille du fichier 8.4 MB ● Maison d’édition Princeton University Press ● Lieu Princeton ● Pays US ● Publié 2016 ● Téléchargeable 24 mois ● Devise EUR ● ID 4945320 ● Protection contre la copie Adobe DRM
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