Classification of reductive homogeneous spaces satisfying strict inequality for Benoist-Kobayashi's functions

Abstract

Let G be a real reductive Lie group and H a reductive subgroup of G. Benoist-Kobayashi studied when L2(G/H) is a tempered representation of G. They introduced the functions on Lie algebras and gave a necessary and sufficient condition for the temperedness of L2(G/H) in terms of an inequality on . In a joint work with Y. Oshima, we considered when L2(G/H) is equivalent to a unitary subrepresentation of L2(G) and gave a sufficient condition for this in terms of a strict inequality of . In this paper, we will classify the pairs (g, h) with g complex reductive and h complex semisimple which satisfy that strict inequality of .