Abstract
We explore the large spin spectrum in two-dimensional conformal field theories with a finite twist gap, using the modular bootstrap in the lightcone limit. By recursively solving the modular crossing equations associated to different $PSL(2,\mathbb{Z})$ elements, we identify the universal contribution to the density of large spin states from the vacuum in the dual channel. Our result takes the form of a sum over $PSL(2,\mathbb{Z})$ elements, whose leading term generalizes the usual Cardy formula to a wider regime. Rather curiously, the contribution to the density of states from the vacuum becomes negative in a specific limit, which can be canceled by that from a non-vacuum Virasoro primary whose twist is no bigger than $c-1\over16$. This suggests a new upper bound of $c-1\over 16$ on the twist gap in any $c>1$ compact, unitary conformal field theory with a vacuum, which would in particular imply that pure AdS$_3$ gravity does not exist. We confirm this negative density of states in the pure gravity partition function by Maloney, Witten, and Keller. We generalize our discussion to theories with $\mathcal{N}=(1,1)$ supersymmetry, and find similar results.
Highlights
Despite progress in the classification program of rational conformal field theories, we have shockingly little understanding of the general landscape of two-dimensional (2D) conformal field theories (CFTs)
PSLð2; ZÞ elements in our formula is identified as a sum over geometries in AdS3.6 In particular, we confirm that the pure gravity partition function has an identical negative density of states in this limit
The current paper provides another piece of evidence that pure gravity in AdS3 might not be dual to a single unitary 2D CFT
Summary
Despite progress in the classification program of rational conformal field theories, we have shockingly little understanding of the general landscape of two-dimensional (2D) conformal field theories (CFTs). We will address the following two general questions for CFTs with a finite twist gap: These two questions are tied together by modular invariance of the torus partition function. The universal contribution from the Virasoro vacuum multiplet to the density of large spin states for any c > 1 CFTwith a finite twist gap. The sum over the PSLð2; ZÞ elements in our formula is identified as a sum over geometries in AdS3.6 In particular, we confirm that the pure gravity partition function has an identical negative density of states in this limit. We multiply both sides by e . βðtgap−c2−41Þ the LHS has a negative βderivative, but the βderivative of the RHS will eventually be positive for large enough β (while still keeping β ≪ 1=β) due to the exponential growth of the factor e . βðtgap−c2−41Þ We arrive at a contradiction
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