On the 2-torsion in class groups of number fields

Abstract

In 2020, Bhargava, Shankar, Taniguchi, Thorne, Tsimerman, and Zhao proved that for a finite extension K/Q of degree n≥ 5, the size of the 2-torsion class group is bounded by \# h2(K)=On,(DK12-12n+), where DK is the absolute discriminant of K. In the present paper, we improve their bound by proving that \# h2(K)=On,(DK12-12n-δK+), for a constant δK≥128n-328n(n-1).

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