A local to global principle for densities over function fields

Abstract

Let d be a positive integer and H be an integrally closed subring of a global function field F. The purpose of this paper is to provide a general sieve method to compute densities of subsets of Hd defined by local conditions. The main advantage of the method relies on the fact that one can use results from measure theory to extract density results over Hd. Using this method we are able to compute the density of the set of polynomials with coefficients in H which give rise to "good" totally ramified extensions of the global function field F. As another application, we give a closed expression for the density of rectangular unimodular matrices with coefficients in H in terms of the L-polynomial of the function field.