We prove that the Jones index of the prime endomorphisms ρₚ in the Bost–Connes system equals p, provide complete proofs via the Takesaki crossed product, and compute the higher invariants: abelian fusion rules (ρₙ ∘ ρₘ = ρₙm), one-dimensional intertwiner spaces, and group-type Ocneanu invariants for p=2 (ℤ/2ℤ) and p=3 (ℤ/3ℤ). The Riemann zeta function is expressed as ζ (β) = ∏ₚ (1 − M: Nₚ^−β) ^−1. We connect the Bost–Connes subfactors with CFT₂ minimal models via the ADE classification: BC and Ising share Jones index M: N=2 but have inequivalent fusion categories. Motivated by Wang and He (arXiv: 2603. 07639, 2026), who demonstrated a quantitative BTZ dual for the critical Ising chain, we predict kIsing ≠ 3/2 for the logarithmic correction coefficient to BTZ entropy at c=1/2.
E. F. Perez-Eugenio (Fri,) studied this question.