English

An induction theorem for groups acting on trees

Representation Theory 2018-10-04 v2 Number Theory

Abstract

If GG is a group acting on a tree XX, and S{\mathcal S} is a GG-equivariant sheaf of vector spaces on XX, then its compactly-supported cohomology is a representation of GG. Under a finiteness hypothesis, we prove that if Hc0(X,S)H_c^0(X, {\mathcal S}) is an irreducible representation of GG, then Hc0(X,S)H_c^0(X, {\mathcal S}) arises by induction from a vertex or edge stabilizing subgroup. If GG is a reductive group over a nonarchimedean local field FF, then Schneider and Stuhler realize every irreducible supercuspidal representation of G(F)G(F) in the degree-zero cohomology of a G(F)G(F)-equivariant sheaf on its reduced Bruhat-Tits building XX. When the derived subgroup of GG has relative rank one, XX is a tree. An immediate consequence is that every such irreducible supercuspidal representation arises by induction from a compact-mod-center open subgroup.

Keywords

Cite

@article{arxiv.1808.08944,
  title  = {An induction theorem for groups acting on trees},
  author = {Martin H. Weissman},
  journal= {arXiv preprint arXiv:1808.08944},
  year   = {2018}
}

Comments

6 pages. v2 with a strengthening of the main theorem

R2 v1 2026-06-23T03:45:07.418Z