Galois Actions on -adic Local Systems and Their Nearby Cycles: A Geometrization of Fourier Eigendistributions on the p-adic Lie Algebra sl(2)

Abstract

In this thesis, two Q-local systems, E E and E E on the regular unipotent subvariety U0,K of p-adic SL2(K) are constructed. Making use of the equivalence between Q-local systems and -adic representations of the \'etale fundamental group, we prove that these local systems are equivariant with respect to conjugation by SL2(K) and that their nearby cycles, when taken with respect to appropriate integral models, descend to local systems on the regular unipotent subvariety of SL2(k), k the residue field of K. Distributions on SL2(K) are then associated to E E and E E and we prove properties of these distributions. Specifically, they are admissible distributions in the sense of Harish-Chandra and, after being transferred to the Lie algebra, are linearly independent eigendistributions of the Fourier transform. Together, this gives a geometrization of important admissible invariant distributions on a nonabelian p-adic group in the context of the Local Langlands program.