Classification of 3-graded causal subalgebras of real simple Lie algebras

Abstract

Let (g,τ) be a real simple symmetric Lie algebra and let W ⊂ g be an invariant closed convex cone which is pointed and generating with τ(W) = -W. For elements h ∈ g with τ(h) = h, we classify the Lie algebras g(W,τ,h) which are generated by the closed convex cones \[C(W,τ,h) := ( W) g 1-τ(h),\] where g-τ 1(h) := \x ∈ g : τ(x) = -x, [h,x] = x\. These cones occur naturally as the skew-symmetric parts of the Lie wedges of endomorphism semigroups of certain standard subspaces. We prove in particular that, if g(W,τ,h) is non-trivial, then it is either a hermitian simple Lie algebra of tube type or a direct sum of two Lie algebras of this type. Moreover, we give for each hermitian simple Lie algebra and each equivalence class of involutive automorphisms τ of g with τ(W) = -W a list of possible subalgebras g(W,τ,h) up to isomorphy.