James Timmins
Published 2023-06-16Version 1
Let F be a non-trivial finite extension of the p-adic numbers, and G be a compact p-adic Lie group whose Lie algebra is isomorphic to a split simple F-Lie algebra. We prove that the mod p Iwasawa algebra of G has no modules of canonical dimension one. One consequence is a new upper bound on the Krull dimension of the Iwasawa algebra. We also prove a canonical dimension-theoretic criterion for a mod p smooth admissible representation to be of finite length. Combining our results shows that any smooth admissible representation of $GL_n(F)$, with central character, has finite length if its dual has canonical dimension two.
Non-existence of non-trivial normal elements in the Iwasawa Algebra of Chevalley groups
Presentation of the Iwasawa algebra of the pro-$p$ Iwahori subgroup of $GL_n(\mathbb{Z}_p)$
Finite length for unramified $\mathrm{GL}_2$
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