Unicity of types and local Jacquet--Langlands correspondence
Abstract
Let F be a non-archimedean local field. For any irreducible representation π of an inner form G'=GLm(D) of G=GLN(F), there exists an irredubile representation of a maximal compact open subgroup in G' which is also a type for π. Then we can consider the problem whether these types are unique or not in some sense. If such types for π are unique, we say π has the strong unicity property of types. On the other hand, there exists a correspondence connecting irreducible representations of G' and G, called the Jacquet--Langland correspondence. In this paper, we study the ralation between the strong unicity of types and the Jacquet--Langlands correspondence.
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