Imaginary quadratic number fields with class groups of small exponent
Abstract
Let D<0 be a fundamental discriminant and denote by E(D) the exponent of the ideal class group Cl(D) of K= Q(D). Under the assumption that no Siegel zeros exist we compute all such D with E(D) is a divisor of 8. We compute all D with |D|≤ 3.1· 1020 such that E(D)≤ 8.
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