We construct an explicit unbounded spectral triple (A,H,D~)(A,H,D~) where H=ℓ2(P×N)H=ℓ2(P×N) with PP the set of prime numbers. The Dirac operator is D~ep,k=(p+1)k1/2ep,kD~ep,k=(p+1)k1/2ep,k, obtained by reduction from an adelic quantum field model using the Kozyrev wavelet basis (the shift p↦p+1p↦p+1 follows from the geometry of the Bruhat–Tits tree). A toy model with pp instead of p+1p+1 is also studied. We prove that the triple is regular in the sense of Connes–Moscovici and has spectral dimension 22 via the Weyl law N(Λ)≍Λ2N(Λ)≍Λ2. The operator ∣D~∣−2∣D~∣−2 belongs to the Dixmier ideal L1,∞L1,∞ and is measurable; its Dixmier trace equals the residue of the spectral zeta function at s=2s=2, giving Trω(∣D~∣−2)=2∑p∈P(p+1)−2.Trω(∣D~∣−2)=2p∈P∑(p+1)−2. The toy model yields 2∑pp−22∑pp−2, and we show that the two operators are inequivalent modulo L01,∞L01,∞ (the difference has a non‑vanishing logarithmic Cesàro mean). For the index of a truncated partial isometry u=eSe+(1−e)u=eSe+(1−e) associated with a finite set of primes PP and a cutoff KK, we observe that D>0D>0 forces the standard odd‑pairing formula to give zero. The correct index is obtained from the Toeplitz extension generated by the shift SS; the K‑theory boundary map yields Ind(u)=∣P∣Ind(u)=∣P∣. This integer also appears as a finite boundary term in the Connes–Chamseddine spectral action. The construction provides the first example of a regular spectral triple of metric dimension 22 based on prime numbers, with explicit invariants linking noncommutative geometry, operator ideals and arithmetic.
Herrero González Carlos (Sun,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: