Gain Bounds for Diagonal Superelliptic Equations under the Strong ABC Conjecture

Abstract

We establish a novel framework for bounding the adapted power gain Gp and approximation gain Ga of coprime integer solutions to the generalized diagonal superelliptic equation Byn = Axn + k with x, y 2. By first deriving a purely structural lower bound for Ga, we demonstrate that these equations are inherently predisposed to high ABC-qualities (q = Ga · Gp). Combined with the Strong ABC conjecture (q < qmax), we prove that the power gain is uniformly bounded by Gp < qmax/Ga,min, providing a theoretical foundation for the numerical observation Gp < 3 for n=2 under the Ultra-Strong conjecture (q < 1.5). Specifically, we show that for k=1, the structural density forces q > n/2, which excludes solutions for n 4 under q < 2. We validate our theoretical bounds using high-quality ABC triples, specifically analyzing the Reyssat (1987), de Weger (1985), and Nitaj (1993) cases to demonstrate the sharpness of the structural approximation gain.