Rational points on certain hyperelliptic curves over finite fields

Abstract

Let K be a field, a, b∈ K and ab≠ 0. Let us consider the polynomials g1(x)=xn+ax+b, g2(x)=xn+ax2+bx, where n is a fixed positive integer. In this paper we show that for each k≥ 2 the hypersurface given by the equation equation* Ski: u2=Πj=1kgi(xj), i=1, 2. equation* contains a rational curve. Using the above and Woestijne's recent results Woe we show how one can construct a rational point different from the point at infinity on the curves Ci:y2=gi(x), (i=1, 2) defined over a finite field, in polynomial time.