Non-invariance of weak approximation with Brauer--Manin obstruction
Abstract
In this paper, we study weak approximation with Brauer--Manin obstruction with respect to extensions of number fields. For any nontrivial extension L/K, assuming a conjecture of M. Stoll, we prove that there exists a K-threefold satisfying weak approximation with Brauer--Manin obstruction off all archimedean places, while its base change to L fails. Then we illustrate this construction with an explicit unconditional example.
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