A criterion for discrete branching laws for Klein four symmetric pairs and its application to E6(-14)

Abstract

Let G be a noncompact connected simple Lie group, and (G,G) a Klein four symmetric pair. In this paper, the author shows a necessary condition for the discrete decomposability of unitarizable simple (g,K)-modules for Klein for symmetric pairs. Precisely, if certain conditions hold for (G,G), there does not exist any unitarizable simple (g,K)-module that is discretely decomposable as a (g,K)-module. As an application, for G=E6(-14), the author obtains a complete classification of Klein four symmetric pairs (G,G) with G noncompact, such that there exists at least one nontrivial unitarizable simple (g,K)-module that is discretely decomposable as a (g,K)-module and is also discretely decomposable as a (gσ,Kσ)-module for some nonidentity element σ∈.