English

A universal inequality on the unitary 2D CFT partition function

High Energy Physics - Theory 2025-05-06 v3 Statistical Mechanics Mathematical Physics math.MP

Abstract

We prove the conjecture proposed by Hartman, Keller and Stoica [HKS14]: the grand-canonical free energy of a unitary 2D CFT with a sparse spectrum below the scaling dimension c12+ϵ\frac{c}{12}+\epsilon and below the twist c12\frac{c}{12} is universal in the large cc limit for all βLβR4π2\beta_L\beta_R \neq 4\pi^2. The technique of the proof allows us to derive a one-parameter (with parameter α(0,1]\alpha\in(0,1]) family of universal inequalities on the unitary 2D CFT partition function with general central charge c0c\geqslant 0, using analytical modular bootstrap. We derive an iterative equation for the domain of validity of the inequality on the (βL,βR)(\beta_L,\beta_R) plane. The infinite iteration of this equation gives the boundary of maximal-validity domain, which depends on the parameter α\alpha in the inequality. In the cc \to \infty limit, with the additional assumption of a sparse spectrum below the scaling dimension c12+ϵ\frac{c}{12} + \epsilon and the twist αc12\frac{\alpha c}{12} (with α(0,1]\alpha \in (0,1] fixed), our inequality shows that the grand-canonical free energy exhibits a universal large cc behavior in the maximal-validity domain. This domain, however, does not cover the entire (βL,βR)(\beta_L, \beta_R) plane, except in the case of α=1\alpha = 1. For α=1\alpha = 1, this proves the conjecture proposed by [HKS14], and for α<1\alpha < 1, it quantifies how sparseness in twist affects the regime of universality. Furthermore, this implies a precise lower bound on the temperature of near-extremal BTZ black holes, above which we can trust the black hole thermodynamics.

Cite

@article{arxiv.2410.18174,
  title  = {A universal inequality on the unitary 2D CFT partition function},
  author = {Indranil Dey and Sridip Pal and Jiaxin Qiao},
  journal= {arXiv preprint arXiv:2410.18174},
  year   = {2025}
}

Comments

44 pages, 8 figures; v2: minor revision, references updated; v3: minor revision

R2 v1 2026-06-28T19:33:21.322Z