On the p-ranks of the ideal class groups of imaginary quadratic fields

Abstract

For a prime number p ≥ 5, we explicitly construct a family of imaginary quadratic fields K with ideal class groups ClK having p-rank rkp(ClK) at least 2. We also quantitatively prove, under the assumption of the abc-conjecture, that for sufficiently large positive real numbers X and any real number with 0 < < 1p - 1, the number of imaginary quadratic fields K with the absolute value of the discriminant dK ≤ X and rkp(ClK) ≥ 2 is X1p - 1 - . This improves the previously known lower bound of X1p - due to Byeon and the recent bound X1p/( X)2 due to Kulkarni and Levin.

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