Abstract
For each odd prime , we conjecture the distribution of the -torsion subgroup of as ranges over real quadratic fields, or over imaginary quadratic fields. We then prove that the average size of the -torsion subgroup of is as predicted by this conjecture.
Citation
Bruce W. Jordan. Zev Klagsbrun. Bjorn Poonen. Christopher Skinner. Yevgeny Zaytman. "Statistics of $K$-groups modulo $p$ for the ring of integers of a varying quadratic number field." Tunisian J. Math. 2 (2) 287 - 307, 2020. https://doi.org/10.2140/tunis.2020.2.287
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