Realizations of globally exceptional Z2 × Z2- symmetric spaces
Abstract
A classification is given of the exceptional Z2 × Z2-symmetric spaces G/K by A.Kollross, where G is an exceptional compact Lie group or S\!pin(8), and moreover the structure of K is determined as Lie algebra. In the present article, we give a pair of commuting involutive automorphisms (involutions) σ, τ of G concretely and determine the structure of group Gσ Gτ corresponding to Lie algebra gσ gτ, where G is an exceptional compact Lie group. Thereby, we realize exceptional Z2 × Z2-symmetric spaces, globally.
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