Selmer ranks under quadratic twists satisfying the Heegner hypothesis
Abstract
We investigate variations of Selmer ranks under quadratic twists satisfying the Heegner hypothesis. In particular, starting with an elliptic curve E/Q with partial 2-torsion and a common relaxed Selmer group, we derive explicit formulae describing the effect of twisting on Selmer ranks in terms of matrices over F2. As an application, we show that these formulae are compatible with predictions made by the parity conjecture.
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