On the Enumeration of Irreducible Polynomials over GF(q) with Prescribed Coefficients

Abstract

We present an efficient deterministic algorithm which outputs exact expressions in terms of n for the number of monic degree n irreducible polynomials over Fq of characteristic p for which the first l < p coefficients are prescribed, provided that n is coprime to p. Each of these counts is 1n(qn-l + O(qn/2)). The main idea behind the algorithm is to associate to an equivalent problem a set of Artin-Schreier curves defined over Fq whose number of Fqn-rational affine points must be combined. This is accomplished by computing their zeta functions using a p-adic algorithm due to Lauder and Wan. Using the computational algebra system Magma one can, for example, compute the zeta functions of the arising curves for q=5 and l=4 very efficiently, and we detail a proof-of-concept demonstration. Due to the failure of Newton's identities in positive characteristic, the l p cases are seemingly harder. Nevertheless, we use an analogous algorithm to compute example curves for q = 2 and l 7, and for q = 3 and l = 3. Again using Magma, for q = 2 we computed the relevant zeta functions for l = 4 and l = 5, obtaining explicit formulae for these open problems for n odd, as well as for subsets of these problems for all n, while for q = 3 we obtained explicit formulae for l = 3 and n coprime to 3. We also discuss some of the computational challenges and theoretical questions arising from this approach in the general case and propose some natural open problems.