Diophantine equations: a systematic approach

Abstract

This paper initiates a novel research direction in the theory of Diophantine equations: define an appropriate version of the equation's size, order all polynomial Diophantine equations starting from the smallest ones, and then solve the equations in that order. By combining a new computer-aided procedure with human reasoning, we solved the Hilbert's tenth problem for all polynomial Diophantine equations of size less than 31, where the size is defined in (Zidane, 2018). In addition, we solved this problem for all equations of size equal to 31, with a single exception. Further, we solved the Hilbert's tenth problem for all two-variable Diophantine equations of size less than 32, all symmetric equations of size less than 39, all three-monomial equations of size less than 45, and, in each category, identified the explicit smallest equations for which the problem remains open. As a result, we derived a list of equations that are very simple to write down but which are apparently difficult to solve. As we know from the example of Fermat's Last Theorem, such equations have a potential to stimulate the development of new methods in number theory.