Discretely decomposable restrictions of (g,K)-modules for Klein four symmetric pairs of exceptional Lie groups of Hermitian type

Abstract

Let (G,G) be a Klein four symmetric pair. The author wants to classify all the Klein four symmetric pairs (G,G) such that there exists at least one nontrivial unitarizable simple (g,K)-module πK that is discretely decomposable as a (g,K)-module. In this article, three assumptions will be made. Firstly, G is an exceptional Lie group of Hermitian type, i.e., G=E6(-14) or E7(-25). Secondly, G is noncompact. Thirdly, there exists an element σ∈ corresponding to a symmetric pair of anti-holomorphic type such that πK is discretely decomposable as a (gσ,Kσ)-module.