“This paper presents a theoretical proof that AGI systems will structurally collapse under certain semantic conditions…”
No it doesn’t.
Shannon entropy measures statistical uncertainty in data. It says nothing about whether an agent can invent new conceptual frames. Equating “frame changes” with rising entropy is a metaphor, not a theorem, so it doesn’t even make sense as a mathematical proof.
This is philosophical musing at best.
Correct: Shannon entropy originally measures statistical uncertainty over a fixed symbol space. When the system is fed additional information/data, then entropy goes down, uncertainty falls. This is always true in situations where the possible outcomes are a) sufficiently limited and b)unequally distributed. In such cases, with enough input, the system can collapse the uncertainty function within a finite number of steps.
But the paper doesn’t just restate Shannon.
It extends this very formalism to semantic spaces where the symbol set itself becomes unstable. These situations arise when (a) entropy is calculated across interpretive layers (as in LLMs), and (b) the probability distribution follows a heavy-tailed regime (α ≤ 1). Under these conditions, entropy divergence becomes mathematically provable.
This is far from being metaphorical: it’s backed by formal Coq-style proofs (see Appendix C in he paper).
AND: it is exactly the mechanism that can explain the Apple-Papers' results
Your paper only claims that those Coq snippets constitute a "constructive proof sketch". Have those formalizations actually been verified, and if so, why not include the results in the paper?
Separately from that, your entire argument wrt Shannon hinges on this notion that it is applicable to "semantic spaces", but it is not clear on what basis this jump is made.