Uniqueness of Ginzburg-Rallis models: the Archimedean case
arXiv:0903.1411
Abstract
In this paper, we prove the uniqueness of Ginzburg-Rallis models in the archimedean case. As a key ingredient, we introduce a new descent argument based on two geometric notions attached to submanifolds, which we call metrical properness and unipotent $Ï$-incompatibility.