The Meta-Principle: A Type-Theoretic Theorem and Its Interpretation

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Abstract

We formalize and prove a single theorem in a standard dependent type setting: there is no term of type Recognition(Nothing, Nothing). The result follows immediately from the definitions (the empty type has no inhabitants), and we provide a Lean proof with an archived, pinned artifact. We state the intended interpretation and its limits: types denote sorts of possible entities, terms denote existents, and the empty type denotes a sort with no existents. Under this conventional interpretation, the theorem says that a recognition event requires existents and therefore cannot arise from emptiness. This note focuses on the formal theorem and reproducibility; broader physical consequences are deferred to a companion work.

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europepmc
last seen: 2026-05-20T01:45:00.602351+00:00
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last seen: 2026-06-04T02:00:05.705006+00:00
License: CC-BY-4.0