Complete Intersections of Two Quadrics and Galois Cohomology
classification
🧮 math.NT
math.AG
keywords
cohomologycompletecurvegaloisintersectionsnonsingularquadricsarbitrary
read the original abstract
For each nonsingular hyperelliptic curve of arbitrary genus, we construct a natural injection from the Galois cohomology of 2-torsion subgroups of Jacobian varieties of the curve to the set of isomorphism classes of nonsingular complete intersections of two quadrics. This gives a generalization of the result of Flynn and Skorobogatov.
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