Pure spinors and a construction of the E*-Lie algebras

Abstract

Let (V,g) be a 2n-dimensional hyperbolic space and C(V,g) its Clifford algebra. C(V,g) has a Z-grading, Ck , and an algebra isomorphism C(V,g) End(S), S the space of spinors. \'E. Cartan defined operators Lk: End(S) Ck which are involved in the definition of pure spinors. We shall give a more refined study of the operator L2, in fact, obtain explicit formulae for it in terms of spinor inner products and combinatorics, as well as the matrix of it in a basis of pure spinors. Using this information we give a construction of the exceptional Lie algebras e6, e7, e8 completely within the theory of Clifford algebras and spinors.