Monica Nevins
Published 2013-02-22, updated 2014-09-12Version 3
Using Bruhat-Tits theory, we analyse the restriction of depth-zero representations of a semisimple simply connected $p$-adic group $G$ to a maximal compact subgroup $K$. We prove the coincidence of branching rules within classes of Deligne-Lusztig supercuspidal representations. Furthermore, we show that under obvious compatibility conditions, the restriction to $K$ of a Deligne-Lusztig supercuspidal representation of $G$ intertwines with the restriction of a depth-zero principal series representation in infinitely many distinct components of arbitrarily large depth. Several qualitative and quantitative results are obtained, and their use is illustrated in an example.
Comments: Final version: applications to bounds on GK-dimension added; deeper discussion conditions for coincidence of full branching rules of supercuspidals, final example corrected to include all three conjugacy classes of maximal tori
Journal: Journal of Algebra 408 (2014) 1--27
Branching of unitary $\operatorname{O}(1,n+1)$-representations with non-trivial $(\mathfrak{g},K)$-cohomology
Motivic nature of character values of depth-zero representations
Modular representations and branching rules for affine and cyclotomic Yokonuma-Hecke algebras
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