Local statistics and average rank of genus g hyperelliptic curves with a Weierstrass point

Abstract

In this paper, we determine the probability that a genus g hyperelliptic curve with a Weierstrass point over a number field has good reduction at a given prime of residue characteristic >2g+1. We also obtain analogous probability formulas for several other reduction types, including cases with positive toric or unipotent rank. As an application, assuming the Hasse--Weil conjecture and the generalized Riemann hypothesis, we derive an explicit upper bound for the average analytic rank of genus g hyperelliptic curves with a Weierstrass point.

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