Counting Polynomials via Galois Actions on Root Subsets
Abstract
This paper studies the number of monic integer polynomials f of height at most H whose Galois group, endowed with the action on the roots, is isomorphic to a prescribed permutation group (G,). New upper bounds are obtained for several families of groups: transitive subgroups of the wreath product Sm Sr in the primitive action; k-homogeneous subgroups of Sm in the action on k-subsets of \1,…,m\; k-transitive subgroups of Sm in the action on k-tuples of distinct elements of \1,…,m\. Almost all finite groups in their regular permutation representation are also treated.
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