On Flag Domains in the Supersymmetric Setting

Abstract

Flag domains are open orbits of real forms GR of complex reductive Lie supergroups G in G-flag supermanifolds Z = G/P. This thesis discusses three topics from the theory of these flag domains: 1. Measurability(i.e. existence of GR-invariant Berezinian densities) 2. Global holomorphic superfunctions 3. Cycle spaces and the Double Fibration Transform A revision of the respective classical results is included in the second chapter. This thesis provides a classification of all measurable flag domains and of the global holomorphic functions on all flag domains. Moreover, the last chapter provides a possible link between the representation theory of real reductive (super) Lie groups and the Bott-Borel-Weyl Theory for complex Lie superalgebras.