An improved error term for counting D4-quartic fields
Abstract
We prove that the number of quartic fields K with discriminant |K|≤ X whose Galois closure is D4 equals CX+O(X5/8+), improving the error term in a well-known result of Cohen, Diaz y Diaz, and Olivier. We prove an analogous result for counting quartic dihedral extensions over an arbitrary base field.
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