Takashi Taniguchi, Frank Thorne
Published 2011-02-14Version 1
We prove the existence of secondary terms of order X^{5/6} in the Davenport-Heilbronn theorems on cubic fields and 3-torsion in class groups of quadratic fields. For cubic fields this confirms a conjecture of Datskovsky-Wright and Roberts. We also prove a variety of generalizations, including to arithmetic progressions, where we discover a curious bias in the secondary term. Roberts' conjecture has also been proved independently by Bhargava, Shankar, and Tsimerman. In contrast to their work, our proof uses the analytic theory of zeta functions associated to the space of binary cubic forms, developed by Shintani and Datskovsky-Wright.
Comments: 40 pages; submitted
Orbital L-functions for the space of binary cubic forms
Relations among Dirichlet series whose coefficients are class numbers of binary cubic forms II
Secondary Term of Asymptotic Distribution of $S_3\times A$ Extensions over $\mathbb{Q}$
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