Grassmannian perspectives of classical Lie groups and Cartan involutions

Abstract

Classical noncompact reductive Lie group G admits a compactification G as a Riemannian symmetric space by He. First, we provide a unified construction of these compactifications via Grassmannian geometry and realize the group structures in terms of the geometry of configurations of linear subspaces. Second, we show that the Cartan involution on G extends uniquely to an isometric involution on G and G = G = K, the maximal compact subgroup of G. Third, we show that η(g) = (g)-1 extends uniquely to an isometric involution η on G and Gη = Gc/K, the compact symmetric space dual to (Gη)0 = G/K. This provides a natural generalization of the classical Borel embeddings G/K Gc/K. Furthermore, K and Gc/K form a complementary pair of reflective submanifolds in G.