A unified parametric approach to the Erdos--Straus conjecture with explicit solutions for a set of integers of natural density one

Abstract

We develop a parametric approach to study the Diophantine equation kn = 1x + 1y + 1z, underlying the Erdos--Straus (k=4), Sierpi\'nski (k=5), and related generalizations. We introduce and analyze the properties of the fundamental function Fx,t(k)(n) = t2(kx-n)2 - 2nxt, whose being a perfect square is equivalent to yielding a solution of these conjectures. In the classical Erdos--Straus case (k=4), for the residue classes n 0,2,3 4, we provide explicit symmetric solutions y=z, covering already 75\% of all integers. For the historically most resistant class n 1 4, we construct explicit symmetric solutions based on the existence of a divisor b 3 4, and we further show that this condition is satisfied for almost all such integers: the set of exceptions has natural density zero. Consequently, the Erdos--Straus conjecture is verified for a proportion of integers tending to 1 in this class. These results yield infinitely many new families of explicit solutions not covered by previous constructions, highlight the structural behavior of F.