Corpus v3 · Formal theorem
cid005316
FTH0054canonicalv1K6_object_closure (theorem)
/-- [I.K6] **Object Closure**: Obj(τ) = {ω} ∪ O_α ∪ O_π ∪ O_γ ∪ O_η. No other objects exist. In our representation, this is definitional: every `TauObj` is constructed from a `Generator` seed, and `Generator` has exactly 5 constructors. -/
Formalization
lean_axiom_freesorries: 0project axioms: 0
Identifiers
Aliases & legacy IDs
K6_object_closurek6-object-closureTauLib.BookI.Kernel.Axioms::K6_object_closureRelease lines
corpus_v2corpus_v3_workingVersion & History
Status disclaimer
A Corpus Item page reports the program's current internal record for this item. It does not imply external verification, scientific consensus, or final proof unless explicitly stated. Read it together with its dependencies, formalization status, and the program's overall stance.