Upper bounds for the number of number fields with prescribed Galois group
Abstract
Let n be a positive integer and G be a transitive permutation subgroup of Sn. Given a number field K with [K:Q]=n, we let K be its Galois closure over Q and refer to Gal(K/Q) as its Galois group. We may identify this Galois group with a transitive subgroup of Sn. Given a real number X>0, we set Nn(X;G) to be the number of such number fields K for which the absolute discriminant is bounded above by X, and for which Gal(K/Q) is isomorphic to G as a permutation subgroup of Sn. We prove an asymptotic upper bound for Nn(X;G) as X→∞. This result is conditional and based upon the non-vanishing of certain polynomial determinants in n-variables. We expect that these determinants are non-vanishing for many groups, and demonstrate through some examples how they may be computed.
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