Absolutely split locally free sheaves on proper $k$-schemes and Brauer--Severi varieties

Published 5 Jan 2015 in math.AG | (1501.00859v2)

Abstract: We classify absolutely split vector bundles on proper $k$-schemes. More precise, we prove that the closed points of the Picard scheme are in one-to-one correspondence with indecomposable absolutely split vector bundles. Furthermore, we apply the obtained results to study the geometry of (generalized) Brauer--Severi varieties.

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Saša Novaković

Absolutely split locally free sheaves on proper $k$-schemes and Brauer--Severi varieties

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Absolutely split locally free sheaves on proper $k$-schemes and Brauer--Severi varieties

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