Superelliptic equations arising from sums of consecutive powers

Abstract

Using only elementary arguments, Cassels solved the Diophantine equation (x-1)3+x3+(x+1)3=z2 in integers x, z. The generalization (x-1)k+xk+(x+1)k=zn (with x, z, n integers and n 2) was considered by Zhongfeng Zhang who solved it for k=2, 3, 4 using Frey-Hellegouarch curves and their Galois representations. In this paper, by employing some sophisticated refinements of this approach, we show that the only solution for k=5 is x=z=0, and that there are no solutions for k=6. The chief innovation we employ is a computational one, which enables us to avoid the full computation of data about cuspidal newforms of high level.