On the density of abelian l-extensions

Abstract

We derive an asymptotic formula which counts the number of abelian extensions of prime degrees over rational function fields. Specifically, let be a rational prime and K a rational function field Fq(t) with q. Let Discf(F/K) denote the finite discriminant of F over K. Denote the number of abelian -extensions F/K with deg(Discf(F/K)) = (-1)α n by a(n), where α=α(q, ) is the order of q in the multiplicative group ( Z/ Z)×. We give a explicit asymptotic formula for a(n). In the case of cubic extensions with q 2 3, our formula gives an exact analogue of Cohn's classical formula.