Entropy splitting
Entropy splitting theorem: total holomorphic entropy decomposes as S(n) = S_def(n) + S_ref(n) + epsilon(n), where the cross-term epsilon(n) >= 0 satisfies epsilon(n) <= S_def(n); when S_def = 0, the total entropy equals the refinement entropy exactly.
What this page is
This is a public Results-lane surface for a noteworthy Physics Registry item. It is generated from the Corpus Registry triage catalogue and keeps the generic Result catalogue unchanged.
Registry evidence
- Registry item: V.T56
- Type: theorem
- Scope: tau-effective
- Lean status: formalized
- Book / part / chapter: Book V · Part 3 · Chapter 22
Result summary
Entropy splitting theorem: total holomorphic entropy decomposes as S(n) = S_def(n) + S_ref(n) + epsilon(n), where the cross-term epsilon(n) >= 0 satisfies epsilon(n) <= S_def(n); when S_def = 0, the total entropy equals the refinement entropy exactly.
Related Results surfaces
- No existing public Results surface is linked yet; this record is promoted as a standalone Registry-backed result.
Reading role
Read as a standalone Registry-backed noteworthy result.
Claim boundary
This page reports a Registry-backed internal result surface. It is not an external validation claim, a scientific consensus claim, or independent acceptance.
Curation rationale
- physics-facing terms: entropy
- theorem/proposition-class item appears externally legible enough for standalone review
Review notes
- No additional review notes recorded.