TL;DR
This paper simplifies the computation of Galois orbits on root systems, crucial for character formulas in p-adic groups, by reducing it to automorphism actions, enabling easier verification of stability conditions.
Contribution
It redefines the orbit counting in terms of automorphism actions, providing a systematic reduction method for all cases.
Findings
Reduced orbit counting to automorphism actions
Provided a unified approach for all root system cases
Facilitated stability verification of character sums
Abstract
The computation of the characters of supercuspidal representations of a p-adic group involves some 4th roots of unity whose values are defined in terms of orbits of the Galois group of a p-field on a root system. The part of the definition that is of interest in the verification of stability of character sums involves just the parity of the number of Galois orbits. In this paper, we re-cast the definition (nearly) in terms only of the abstract action of a pair of automorphisms on a root system, and compute it by a series of reductions in all cases.
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Taxonomy
TopicsAdvanced Algebra and Geometry · Algebraic Geometry and Number Theory · Algebraic structures and combinatorial models