Projective Bundle Theorem in MW-Motivic Cohomology
Abstract
We present a version of projective bundle theorem in MW-motives (resp. Chow-Witt rings), which says that CH*(P(E)) is determined by CH*(X), CH*(X,det(E)), CH*(X) and Sq2 for smooth quasi-projective schemes X and vector bundles E over X with e(E)=0∈ Hn(X,W(det(E))), provided that 2CH*(X)=0. As an application, we compute the MW-motives of blow-ups with smooth centers. Moreover, we discuss the invariance of Chow-Witt cycles of projective bundles under automorphisms of vector bundles.
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