English

Hecke algebra isomorphisms and adelic points on algebraic groups

Number Theory 2015-08-05 v3 Algebraic Geometry

Abstract

Let GG denote a linear algebraic group over Q\mathbf{Q} and KK and LL two number fields. Assume that there is a group isomorphism of points on GG over the finite adeles of KK and LL, respectively. We establish conditions on the group GG, related to the structure of its Borel groups, under which KK and LL have isomorphic adele rings. Under these conditions, if KK or LL is a Galois extension of Q\mathbf{Q} and G(AK,f)G(\mathbf{A}_{K,f}) and G(AL,f)G(\mathbf{A}_{L,f}) are isomorphic, then KK and LL are isomorphic as fields. We use this result to show that if for two number fields KK and LL that are Galois over Q\mathbf{Q}, the finite Hecke algebras for GL(n)\mathrm{GL}(n) (for fixed n>1n > 1) are isomorphic by an isometry for the L1L^1-norm, then the fields KK and LL are isomorphic. This can be viewed as an analogue in the theory of automorphic representations of the theorem of Neukirch that the absolute Galois group of a number field determines the field if it is Galois over Q\mathbf{Q}.

Keywords

Cite

@article{arxiv.1409.1385,
  title  = {Hecke algebra isomorphisms and adelic points on algebraic groups},
  author = {Gunther Cornelissen and Valentijn Karemaker},
  journal= {arXiv preprint arXiv:1409.1385},
  year   = {2015}
}

Comments

19 pages - completely rewritten

R2 v1 2026-06-22T05:48:26.177Z