Divisibility of class numbers of imaginary quadratic function fields by a fixed odd number

Abstract

In this paper we find a new lower bound on the number of imaginary quadratic extensions of the function field Fq(x) whose class groups have elements of a fixed odd order. More precisely, for q, a power of an odd prime, and g a fixed odd positive integer 3, we show that for every ε >0, there are qL(1/2+32(g+1)-ε) polynomials f ∈ Fq[x] with f=L, for which the class group of the quadratic extension Fq(x, f) has an element of order g. This sharpens the previous lower bound qL(1/2+1g) of Ram Murty. Our result is a function field analogue to a similar result of Soundararajan for number fields.