Primitive Representations of Integers by x3+y3+2z3

Abstract

A well-known open problem is to show that the cubic form x3+y3+2z3 represents all integers. An obvious variant of this problem is whether every integer can be primitively represented by x3+y3+2z3. In other words, given an integer n, are there coprime integers x, y, z such that x3+y3+2z3=n? In this note we answer this variant question negatively. Indeed, we use cubic reciprocity to show that for every integral solution to x3+y3+2z3=8m,the unknowns x, y, z are divisible by 2m.