Primes of the form x2+n*y2 in function fields

Abstract

Let n be a square-free polynomial over Fq, where q is an odd prime power. In this paper, we determine which irreducible polynomials p in Fq[x] can be represented in the form X2+nY2 with X, Y in Fq[x]. We restrict ourselves to the case where X2+nY2 is anisotropic at infinity. As in the classical case over Z, the representability of p by the quadratic form X2+nY2 is governed by conditions coming from class field theory. A necessary (and almost sufficient) condition is that the ideal generated by p splits completely in the Hilbert class field H of K = Fq(x,sqrt-n) (for the appropriate notion of Hilbert class field in this context). In order to get explicit conditions for p to be of the form X2+nY2, we use the theory of sgn-normalized rank-one Drinfeld modules. We present an algorithm to construct a generating polynomial for H/K. This algorithm generalizes to all situations an algorithm of D.S. Dummit and D.Hayes for the case where -n is monic of odd degree.