English

Parity and the modular bootstrap

High Energy Physics - Theory 2018-09-12 v3

Abstract

We consider unitary, modular invariant, two-dimensional CFTs which are invariant under the parity transformation PP. Combining PP with modular inversion SS leads to a continuous family of fixed points of the SPSP transformation. A particular subset of this locus of fixed points exists along the line of positive left- and right-moving temperatures satisfying βLβR=4π2\beta_L \beta_R = 4\pi^2. We use this fixed locus to prove a conjecture of Hartman, Keller, and Stoica that the free energy of a large-cc CFT2_2 with a suitably sparse low-lying spectrum matches that of AdS3_3 gravity at all temperatures and all angular potentials. We also use the fixed locus to generalize the modular bootstrap equations, obtaining novel constraints on the operator spectrum and providing a new proof of the statement that the twist gap is smaller than (c1)/12(c-1)/12 when c>1c>1. At large cc we show that the operator dimension of the first excited primary lies in a region in the (h,h)(h,\overline{h})-plane that is significantly smaller than h+h<c/6h+\overline{h}<c/6. Our results for the free energy and constraints on the operator spectrum extend to theories without parity symmetry through the construction of an auxiliary parity-invariant partition function.

Keywords

Cite

@article{arxiv.1803.04938,
  title  = {Parity and the modular bootstrap},
  author = {Tarek Anous and Raghu Mahajan and Edgar Shaghoulian},
  journal= {arXiv preprint arXiv:1803.04938},
  year   = {2018}
}

Comments

21 pages, 3 figures, v2 reference and equation added, v3 minor edits and figure 2 improved

R2 v1 2026-06-23T00:51:58.208Z