Classification of reductive real spherical pairs II. The semisimple case

Abstract

If g is a real reductive Lie algebra and h < g is a subalgebra, then ( g, h) is called real spherical provided that g = h + p for some choice of a minimal parabolic subalgebra p ⊂ g. In this paper we classify all real spherical pairs ( g, h) where g is semi-simple but not simple and h is a reductive real algebraic subalgebra. The paper is based on the classification of the case where g is simple (see arXiv:1609.00963) and generalizes the results of Brion and Mikityuk in the (complex) spherical case.