Geometry of second adjointness for p-adic groups
Abstract
We present a geometric proof of Bernstein's second adjointness for a reductive -adic group. Our approach is based on geometry of the wonderful compactification and related varieties. Considering asymptotic behavior of a function on the group in a neighborhood of a boundary stratum of the compactification, we get a "co-specialization" map between spaces of functions on various varieties with action. These maps can be viewed as maps of bimodules for the Hecke algebra, and the corresponding natural transformations of functors lead to the second adjointness. We also get a formula for the "co-specialization" map expressing it as a composition of the orishperic transform and inverse intertwining operator; a parallel result for -modules was obtained in arXiv:0902.1493. As a byproduct we obtain a formula for the Plancherel functional restricted to a certain commutative subalgebra in the Hecke algebra, generalizing a result by Opdam.
Cite
@article{arxiv.1112.6340,
title = {Geometry of second adjointness for p-adic groups},
author = {Roman Bezrukavnikov and David Kazhdan},
journal= {arXiv preprint arXiv:1112.6340},
year = {2015}
}
Comments
40 pages; minor, mostly typographical corrections; final version