Manin obstruction

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In mathematics, in the field of arithmetic algebraic geometry, the Manin obstruction is attached to a geometric object X which measures the failure of the Hasse principle for X: that is, if the value of the obstruction is non-trivial, then X may have points over all local fields but not over a global field.

For abelian varieties the Manin obstruction is just the Tate-Shafarevich group and fully accounts for the failure of the local-to-global principle. There are however examples, due to Skorobogatov, of varieties with trivial Manin obstruction which have points everywhere locally and yet no global points.

References

Serge Lang (1997). Survey of Diophantine geometry. Springer-Verlag, 250-258. ISBN 3-540-61223-8.
Alexei N. Skorobogatov (1999). "Beyond the Manin obstruction". Invent. Math. 135 (2): 399-424.

Alexei Skorobogatov (2001). Torsors and rational points, 1-7,112. ISBN 0521802377.

Manin obstruction

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