On perfect powers that are sums of cubes of a seven term arithmetic progression

Abstract

We prove that the equation (x-3r)3+(x-2r)3 + (x-r)3 + x3 + (x+r)3 + (x+2r)3+(x+3r)3= yp only has solutions which satisfy xy=0 for 1≤ r≤ 106 and p≥ 5 prime. This article complements the work on the equations (x-r)3 + x3 + (x+r)3 = yp and (x-2r)3 + (x-r)3 + x3 + (x+r)3 + (x+2r)3= yp . The methodology in this paper makes use of the Primitive Divisor Theorem due to Bilu, Hanrot and Voutier for a complete resolution of the Diophantine equation.