Counting Imaginary Quadratic Fields with an Ideal Class Group of 5-rank at least 2
Abstract
We prove that there are X13( X)2 imaginary quadratic fields k with discriminant |dk|≤ X and an ideal class group of 5-rank at least 2. This improves a result of Byeon, who proved the lower bound X14 in the same setting. We use a method of Howe, Lepr\'evost, and Poonen to construct a genus 2 curve C over Q such that C has a rational Weierstrass point and the Jacobian of C has a rational torsion subgroup of 5-rank 2. We deduce the main result from the existence of the curve C and a quantitative result of Kulkarni and the second author.
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