English

Null energy constraints on two-dimensional RG flows

High Energy Physics - Theory 2023-10-25 v1 High Energy Physics - Phenomenology

Abstract

We study applications of spectral positivity and the averaged null energy condition (ANEC) to renormalization group (RG) flows in two-dimensional quantum field theory. We find a succinct new proof of the Zamolodchikov cc-theorem, and derive further independent constraints along the flow. In particular, we identify a natural CC-function that is a completely monotonic function of scale, meaning its derivatives satisfy the alternating inequalities (1)nC(n)(μ2)0(-1)^nC^{(n)}(\mu^2) \geq 0. The completely monotonic CC-function is identical to the Zamolodchikov CC-function at the endpoints, but differs along the RG flow. In addition, we apply Lorentzian techniques that we developed recently to study anomalies and RG flows in four dimensions, and show that the Zamolodchikov cc-theorem can be restated as a Lorentzian sum rule relating the change in the central charge to the average null energy. This establishes that the ANEC implies the cc-theorem in two dimensions, and provides a second, simpler example of the Lorentzian sum rule.

Cite

@article{arxiv.2310.15217,
  title  = {Null energy constraints on two-dimensional RG flows},
  author = {Thomas Hartman and Grégoire Mathys},
  journal= {arXiv preprint arXiv:2310.15217},
  year   = {2023}
}

Comments

20 pages plus appendices, 3 figures

R2 v1 2026-06-28T12:59:23.840Z