Semisimple types for quaternionic forms of p-adic classical groups and compatible beta-extensions
Abstract
Let G be a quaternionic form of a p-adic classical group (p odd). We construct a Bushnell-Kutzko-Stevens type for every Bernstein block of the category of smooth complex representations of G. Further we construct a system of compatible β-extensions, i.e. a family of β-extensions parametrised by the points of a chamber of the Bruhat-Tits building of the centralizer Gβ which are related via transfer.
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