Root number variation on families of elliptic surfaces
Linfoot Number Theory Seminar
15th April 2026, 11:00 am – 12:00 pm
Fry Building, 2.04
We study the elliptic surface families $y^2=x^3+F(z,w)$ and $y^2=x^3+G(z,w)x$ over $\mathbb{Q}$, where $F,G$ are binary forms with integer coefficients. For $100\%$ of forms of any fixed degree ordered by height,
we obtain weak asymptotic formulae for the average root number.
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