A threefold violating a local-to-global principle for rationality
Abstract
In this note we construct an example of a smooth projective threefold that is irrational over Q but is rational at all places. Our example is a complete intersection of two quadrics in P5, and we show it has the desired rationality behavior by constructing an explicit element of order 4 in the Tate--Shafarevich group of the Jacobian of an associated genus 2 curve.
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