Corpus v3 · Formal theorem
cid006024
FTH0759canonicalv1bridge_algebraic_identity (theorem)
/-- [III.P32] The confinement bridge reduces to the E₆ near-identity. Algebraically: |E₆|·κ(C;3)²·(1−ι)² = |E₆|·ι⁶. Since κ(C;3)² numerator = (ι³·D)² and κ(C;3)² denominator = (D³·(D−ι))², we have κ(C;3)²·(1−ι)² = ι⁶/D⁶ × D²/(D−ι)² × (D−ι)²/D² = ι⁶/D⁶. Cross-multiplied verification: kappa_CC.numer² · (D−ι)² · D⁶ = ι⁶ · kappa_CC.denom² · D² -/
Formalization
lean_axiom_freesorries: 0project axioms: 0
Identifiers
Aliases & legacy IDs
bridge_algebraic_identitybridge-algebraic-identityTauLib.BookIII.Spectral.ConfinementBridge::bridge_algebraic_identityRelease lines
corpus_v2corpus_v3_workingVersion & History
Status disclaimer
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