Conjecture for the asymptotic spectral density of the causal propagator in free scalar QFT, supported by examples, with implications for Lorentzian spectral geometry.
Weyl's Law and Connes' Trace Theorem for Noncommutative Two Tori
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abstract
We prove the analogue of Weyl's law for a noncommutative Riemannian manifold, namely the noncommutative two torus $\mathbb{T}_\theta^2$ equipped with a general translation invariant conformal structure and a Weyl conformal factor. This is achieved by studying the asymptotic distribution of the eigenvalues of the perturbed Laplacian on $\mathbb{T}_\theta^2$. We also prove the analogue of Connes' trace theorem by showing that the Dixmier trace and a noncommutative residue coincide on pseudodifferential operators of order -2 on $\mathbb{T}_\theta^2$.
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gr-qc 1years
2026 1verdicts
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Spectral Density of the Causal Propagator
Conjecture for the asymptotic spectral density of the causal propagator in free scalar QFT, supported by examples, with implications for Lorentzian spectral geometry.