Abstract

We give a construction of a family of nontempered (local and global) Arthur packets of the exceptional group G2. One particular local packet contains a reducible representation. Using a Rankin-Selberg integral, we show that the subspace of the discrete spectrum associated to each packet is a full near equivalence class and this implies the Arthur multiplicity formula for these packets.

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Additional Information

ISSN
1080-6377
Print ISSN
0002-9327
Pages
pp. 1105-1185
Launched on MUSE
2006-10-02
Open Access
No
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