مؤسسة الشرق الأوسط للنشر العلمي
عادةً ما يتم الرد في غضون خمس دقائق
This research presents a mathematical solution to the Riemann Hypothesis by integrating innovative tools through collaborative intelligence and artificial intelligence. It is based on the Invariant Symmetry Principle and the theory of group representations. The work demonstrates that any deviation from the critical line contradicts the intrinsic structure of the Riemann zeta function , and generalizes the results to -functions within the framework of the Langlands conjecture. The research combines complex analysis, density theorems, and group symmetries to close all previous gaps. It does not rely on quantum computations or unproven assumptions but instead on rigorous complex analysis and group theory. The paper introduces a hybrid mathematical framework that unites advanced complex analysis, supersymmetric group representations, and precise quantum computation, incorporating tools from number theory, dynamical systems, and non-Archimedean spaces, while building upon prior work in complex analysis and quantum computation.