Abstract
A Châtelet surface over a field is a typical geometrically rational surface. Its Chow group of zero-cycles has been studied as an important birational invariant by many researchers since the 1970s. Recently, S. Saito and K. Sato obtained a duality between the Chow and Brauer groups from the Brauer-Manin pairing. For a Châtelet surface over a local field, we combine their result with the known calculation of the Chow group to determine the structure and generators of the Brauer group of a regular proper flat model of the surface over the integer ring of the base field.
Citation
Takashi HIROTSU. "Brauer groups of Châtelet surfaces over local fields." Hokkaido Math. J. 48 (1) 141 - 154, February 2019. https://doi.org/10.14492/hokmj/1550480647
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