MetaMoulds and the Geometric Grammar of Spacetime

This audio deep-dive explores Sun Yu-li’s 1994 text, "Formal Language of the Metaphysical," which proposes that language is not merely a human invention but a reflection of the universe’s fundamental geometric architecture. Central to this theory is the concept of "MetaMoulds"—universal, geometric grammar containers where linguistic components are represented as shapes: the subject is a point, the verb is a line, and the object is a plane.

The framework utilizes Leonhard Euler’s mathematical laws to describe a "Twin Genesis" of space, consisting of a Conceptual Space and a Structural Space. Meaning emerges through the interaction between active conceptual dots and reactive structural dots, creating stabilized graphs that obey rigid mathematical rules. This model suggests a revolutionary path for Artificial Intelligence, promising perfect translation by bypassing statistical guessing in favor of geometric precision. Finally, the theory links these modern graphics to ancient Chinese philosophy, claiming that MetaMoulds mirror the derivation of the I Ching’s trigrams, ultimately unifying language, space, and time into a single structural blueprint.