Quaternionic Projective Bundle Theorem and Gysin Triangle in MW-Motivic Cohomology
Abstract
In this paper, we show that the motive of the quaternionic Grassmannian HPn (as defined by I. Panin and C. Walter) splits in the category of effective MW-motives (as defined by B. Calm\`es, F. D\'eglise and J. Fasel). Moreover, we extend this result to an arbitrary symplectic bundle, obtaining the so-called quaternionic projective bundle theorem. Finally, we give the Gysin triangle in MW-motivic cohomology.
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