Triality over Schemes

Abstract

Working over an arbitrary base scheme, we provide an alternative development of triality which does not use Octonion algebras or symmetric composition algebras. Instead, we use the Clifford algebra of the split hyperbolic quadratic form of rank 8 and computations with Chevalley generators of groups of type D4. Following the strategy of The Book of Involutions [KMRT], we then define the stack of trialitarian triples and show it is equivalent to the gerbe of PGO8+--torsors. We show it has endomorphisms generating a group isomorphic to S3 and that several familiar cohomological properties of PGO8+ follow in this setting as a result. Next, we define the stack of trialitarian algebras and show it is equivalent to the gerbe of PGO8+ S3--torsors. Because of this, it is also equivalent to the gerbes of simply connected, respectively adjoint, groups of type D4. We define SpinT and PGO+T for a trialitarian algebra and define concrete functors T SpinT and T PGO+T which realize these equivalences.

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