A canonical map between Hecke algebras

Mori, Andrea; Terracini, Lea

Bollettino dell'Unione Matematica Italiana, Tome 2-A (1999), p. 429-452 / Harvested from Biblioteca Digitale Italiana di Matematica

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Résumé

Sia $D$ un corpo di quaternioni indefinito su $Q$ di discriminante $Δ$ e sia $Γ$ il gruppo moltiplicativo degli elementi di norma 1 in un ordine di Eichler di $D$ di livello primo con $Δ$ . Consideriamo lo spazio $S_{k} (Γ)$ delle forme cuspidali di peso $k$ rispetto a $Γ$ e la corrispondente algebra di Hecke $H^{D}$ . Utilizzando una versione della corrispondenza di Jacquet-Langlands tra rappresentazioni automorfe di $D^{\times}$ e di $G L_{2}$ , realizziamo $H^{D}$ come quoziente dell'algebra di Hecke classica di livello $N Δ$ . Questo risultato permette di ottenere informazioni sulla struttura dell'algebra $H^{D}$ e di definire una struttura intera per lo spazio $S_{k} (Γ)$ .

Publié le : 1999-06-01

MR 1706552 | Zbl 0933.11023

@article{BUMI_1999_8_2B_2_429_0,
     author = {Andrea Mori and Lea Terracini},
     title = {A canonical map between Hecke algebras},
     journal = {Bollettino dell'Unione Matematica Italiana},
     volume = {2-A},
     year = {1999},
     pages = {429-452},
     zbl = {0933.11023},
     mrnumber = {1706552},
     language = {en},
     url = {http://dml.mathdoc.fr/item/BUMI_1999_8_2B_2_429_0}
}

Mori, Andrea; Terracini, Lea. A canonical map between Hecke algebras. Bollettino dell'Unione Matematica Italiana, Tome 2-A (1999) pp. 429-452. http://gdmltest.u-ga.fr/item/BUMI_1999_8_2B_2_429_0/

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