Secondary terms in the counting functions of quartic fields
Abstract
We prove that the smoothed counting function of the set of quartic fields, satisfying any finite set of local conditions, can be written as a linear combination of X,X5/6 X,X5/6, upto an error term of O(X13/16+o(1)). For certain sets of local conditions, namely, those cutting out ``S4-families'' of quartic fields, we explicitly determine the leading constants of the secondary terms. We moreover express these constants in terms of secondary mass formulas associated to families of quartic fields
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