Modern Artificial General Intelligence (AGI) paradigms, including Monte Carlo Tree Search (MCTS) and deep convolutional/transformer networks, fundamentally rely on the assumption of a commutative, smooth Euclidean metric space for probability density estimation. This paper introduces a novel mathematical framework that maps discrete state spacesinto non-commutative topological spaces governed by Rough Operator Algebra (ROA) and the Seonggil Theory of Composite Torsion (STCT). By synchronizing critical localized coordinates with the high-order Riemann Zeta zero spectrum, we induce a catastrophic topological decoherence within the traditional Predictor + UCT (PUCT) evaluation framework.We demonstrate that this microscopic perturbation forces the underlying neural weights to transition from passive statistical pattern matching to active number-theoretic operator computation, providing a foundational architecture for the realization of Artificial Super Intelligence (ASI).
Seonggil Lee (Tue,) studied this question.