The least prime with a given cycle type
Abstract
Let G be a finite group. Let K/k be a Galois extension of number fields with Galois group isomorphic to G, and let C ⊂eq Gal(K/k) G be a conjugacy invariant subset. It is well known that there exists an unramified prime ideal p of k with Frobenius element lying in C and norm satisfying Np |Disc(K)|α for some constant α = α(G,C). There is a rich literature establishing unconditional admissible values for α, with most approaches proceeding by studying the zeros of L-functions. We give an alternative approach, not relying on zeros, that often substantially improves this exponent α for any fixed finite group G, provided C is a union of rational equivalence classes. As a particularly striking example, we prove that there exist absolute constants c1,c2 > 0 such that for any n≥ 2 and any conjugacy class C ⊂ Sn, one may take α(Sn,C) = c1 (-c2n). Our approach reduces the core problem to a question in character theory.
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