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Abstract:We investigate the role of the conductor in analytic rank bounds for elliptic curves over \(\mathbb{Q}\). Let \(E/\mathbb{Q}\) be an elliptic curve with conductor \(N_E\). We consider hypothetical degree-two \(L\)-functions associated to (E) that satisfy analytic continuation, a functional equation involving an arithmetic invariant \(\Phi(E)\), and yield rank bounds of the form
\[
\operatorname{rank}(E)\ll \log \Phi(E).
\]
Using the Modularity Theorem, we show that any such invariant must satisfy
\[
\Phi(E)\ge N_E.
\] Thus the conductor is minimal among arithmetic invariants that can appear in this analytic framework. In particular, the standard logarithmic rank bounds arising from the conductor cannot be improved by replacing \(N_E\) with a strictly smaller invariant while preserving the same degree-two functional equation structure.
These results provide a structural explanation for the distinguished role of the conductor in analytic approaches to the rank problem.

Submission history

From: K Lakshmanan [view email]
[v1] Wed, 25 Jun 2025 07:03:00 UTC (7 KB)
[v2] Tue, 16 Jun 2026 07:48:55 UTC (7 KB)