The average size of 3-torsion in class groups of 2-extensions

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Robert Lemke Oliver, Tufts University
Fine Hall 214

In-Person and Online Talk 

Zoom Link: https://theias.zoom.us/j/88393312988?pwd=emtLbTJ5ZnMvS3hBVmNmYjhIUEFIdz09

We determine the average size of the 3-torsion in class groups of G-extensions of a number field when G is any transitive 2-group containing a transposition, for example D4. It follows from the Cohen--Lenstra--Martinet heuristics that the average size of the p-torsion in class groups of G-extensions of a number field is conjecturally finite for any G and most p. Previously this conjecture had only been proven in the cases of G=S_2 with p=3 and G=S_3 with p=2. We also show that the average 3-torsion in a certain relative class group for these G-extensions is as predicted by Cohen and Martinet, proving new cases of the Cohen--Lenstra--Martinet heuristics. Our new method also works for many other permutation groups G that are not 2-groups.  This is joint work with Jiuya Wang and Melanie Matchett Wood.