Kloosterman sums, elliptic curves, and irreducible polynomials with prescribed trace and norm

Abstract

Let q (q=pr) be a finite field. In this paper the number of irreducible polynomials of degree m in q[x] with prescribed trace and norm coefficients is calculated in certain special cases and a general bound for that number is obtained improving the bound by Wan if m is small compared to q. As a corollary, sharp bounds are obtained for the number of elements in q3 with prescribed trace and norm over q improving the estimates by Katz in this special case. Moreover, a characterization of Kloosterman sums over 2r divisible by three is given generalizing the earlier result by Charpin, Helleseth, and Zinoviev obtained only in the case r odd. Finally, a new simple proof for the value distribution of a Kloosterman sum over the field 3r, first proved by Katz and Livne, is given.