Article contents
Some Orbital Integrals and a Technique for Counting Representations of GL2(F)
Published online by Cambridge University Press: 20 November 2018
Extract
Let F be a local field of characteristic zero, with q elements in its residue field, ring of integers uniformizer ωF and maximal ideal . Let GF = GL2(F). We fix Haar measures dg and dz on GF and ZF, the centre of GF, so that
meas(K) = meas
where K = GL2() is a maximal compact subgroup of GF. If T is a torus in GF we take dt to be the Haar measure on T such that
means(TM)=1
where TM denotes the maximal compact subgroup of T.
- Type
- Research Article
- Information
- Copyright
- Copyright © Canadian Mathematical Society 1978
References
- 1
- Cited by