Rational solutions of certain Diophantine equations involving norms

Abstract

In this note we present some results concerning the unirationality of the algebraic variety Sf given by the equation equation* NK/k(X1+α X2+α2 X3)=f(t), equation* where k is a number field, K=k(α), α is a root of an irreducible polynomial h(x)=x3+ax+b∈ k[x] and f∈ k[t]. We are mainly interested in the case of pure cubic extensions, i.e. a=0 and b∈ k k3. We prove that if degf=4 and the variety Sf contains a k-rational point (x0,y0,z0,t0) with f(t0)≠ 0, then Sf is k-unirational. A similar result is proved for a broad family of quintic polynomials f satisfying some mild conditions (for example this family contains all irreducible polynomials). Moreover, the unirationality of Sf (with non-trivial k-rational point) is proved for any polynomial f of degree 6 with f not equivalent to the polynomial h satisfying the condition h(t)≠ h(ζ3t), where ζ3 is the primitive third root of unity. We are able to prove the same result for an extension of degree 3 generated by the root of polynomial h(x)=x3+ax+b∈ k[x], provided that f(t)=t6+a4t4+a1t+a0∈ k[t] with a1a4≠ 0.