Ezouidi's theorem and the exact root of 9th degree polynomials

The classical theory of polynomial equations reached a critical boundary in the 19th century with the work of Abel and Galois, who demonstrated that no general radical solution exists for polynomial equations of degree five and higher. Since then, algebra has largely focused on structural understanding rather than constructive resolution. Ezouidi’s Theorem introduces a fundamentally different approach. Rather than seeking solutions purely through radicals or group-theoretic constraints, this theorem establishes a new solvability structure that allows 9th-degree equations to be resolved through a systematic and finite analytical process. The method does not contradict Abel’s result; instead, it operates outside the classical radical-solvability framework, opening a new mathematical pathway.