Generalized Mordell curves, generalized Fermat curves, and the Hasse principle

Abstract

A generalized Mordell curve of degree n 3 over is the smooth projective model of the affine curve of the form Az2 = Bxn + C, where A, B, C are nonzero integers. A generalized Fermat curve of signature (n, n, n) with n 3 over is the smooth projective curve of the form Axn + Byn + Czn = 0 for some nonzero integers A, B, C. In this paper, we show that for each prime p with p 1 8 and p 2 3, there exists a threefold p ⊂eq 6 such that certain rational points on p produce infinite families of non-isomorphic generalized Mordell curves of degree 12n and infinite families of generalized Fermat curves of signature (12n, 12n, 12n) for each n 2 that are counterexamples to the Hasse principle explained by the Brauer-Manin obstruction. We also show that the set of special rational points on p producing generalized Mordell curves and generalized Fermat curves that are counterexamples to the Hasse principle is infinite, and can be constructed explicitly.