Diophantine equations with sum of cubes and cube of sum

TL;DR

This paper investigates specific Diophantine equations involving sums of cubes and their relation to elliptic curves, providing classifications of solutions and implications for particle physics.

Contribution

It classifies solutions of a family of Diophantine equations, linking them to elliptic curves and identifying conditions for existence of solutions, including the special case of a = 9.

Findings

Infinite solutions for certain rational coefficients

No solutions for specific fractions of 1/a

Connection between solutions and elliptic curve properties

Abstract

We solve Diophantine equations of the type $ a \, (x^3 \!+ \! y^3 \!+ \! z^3 ) = (x \! + \! y \! + \! z)^3$, where $x,y,z$ are integer variables, and the coefficient $a\neq 0$ is rational. We show that there are infinite families of such equations, including those where $a$ is any cube or certain rational fractions, that have nontrivial solutions. There are also infinite families of equations that do not have any nontrivial solution, including those where $1/a = 1- 24/m$ with restrictions on the integer $m$. The equations can be represented by elliptic curves unless $a = 9$ or 1, and any elliptic curve of nonzero $j$-invariant and torsion group $\mathbb{Z}/3k\mathbb{Z}$ for $k = 2,3,4$, or $\mathbb{Z}/2\mathbb{Z} \times \mathbb{Z}/6\mathbb{Z} $ corresponds to a particular $a$. We prove that for any $a$ the number of nontrivial solutions is at most 3 or is infinite, and for integer $a$ it is either 0 or $\infty$. For $a = 9$, we find the general solution, which depends on two integer parameters. These cubic equations are important in particle physics, because they determine the fermion charges under the $U(1)$ gauge group.