Classification of nilpotent and semisimple fourvectors of a real eight-dimensional space
Abstract
In 1981 Antonyan classified the orbits of SL(8,C) on 4 C8. This is an example of a θ-group action as introduced and studied by Vinberg. The orbits of a θ-group are divided into three classes: nilpotent, semisimple and mixed. We consider the action of SL(8,R) on 4 R8 and classify the nilpotent and semisimple orbits as well as the Cartan subspaces. The semisimple orbits are divided into 1441 parametrized classes. Due to this high number a classification of the mixed orbits does not seem feasible. Our methods are based on Galois cohomology.
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