Quaternionic Artin representations and nontraditional arithmetic statistics
Rohrlich, David E.
We classify and then attempt to count the real quadratic fields
(ordered by the size of the totally positive fundamental unit, as in Sarnak
[14], [15]) from which quaternionic Artin representations of minimal conductor
can be induced. Some of our results can be interpreted as criteria for a real
quadratic field to be contained in a Galois extension of Q with controlled
ramification and Galois group isomorphic to a generalized quaternion group.
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