Period-index bounds for arithmetic threefolds
Abstract
The standard period-index conjecture for the Brauer group of a field of transcendence degree 2 over a p-adic field predicts that the index divides the cube of the period. Using Gabber's theory of prime-to- alterations and the deformation theory of twisted sheaves, we prove that the index divides the fourth power of the period for every Brauer class whose period is prime to 6p, giving the first uniform period-index bounds over such fields.
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