Realizations of inner automorphisms of order four and fixed points subgroups by them on the connected compact exceptional Lie group E8, Part III
Abstract
The compact simply connected Riemannian 4-symmetric spaces were classified by J.A. Jim\'enez according to type of the Lie algebras. As homogeneous manifolds, these spaces are of the form G/H, where G is a connected compact simple Lie group with an automorphism γ of order four on G and H is a fixed points subgroup Gγ of G. According to the classification by J.A. Jim\'enez, there exist seven compact simply connected Riemannian 4-symmetric spaces G/H in the case where G is of type E8 . In the present article, %as Part II continuing from Part I, for the connected compact %exceptional Lie group E8, we give the explicit form of automorphisms ω4,4 and 4 of order four on E8 induced by the C-linear transformations ω4, 4 and 4 of the 248-dimensional C -vector space e8C, respectively. Further, we determine the structure of these fixed points subgroups (E8)ω4, (E8)_4 and (E8)_4 of E8 . These amount to the global realizations of three spaces among seven Riemannian 4-symmetric spaces G/H above corresponding to the Lie algebras h=su(2) iR e6, iR so(14) and h =su(2) iR so(12), where h= Lie(H) . With this article, the all realizations of inner automorphisms of order four and fixed points subgroups by them have been completed in E8 .
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