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1. Null energy constraints on two-dimensional RG flows

   https://doi.org/10.1007/JHEP01(2024)102  

   Hartman, Thomas; Mathys, Grégoire (January 2024, Journal of High Energy Physics)

   A<sc>bstract</sc> 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 Zamolodchikovc-theorem, and derive further independent constraints along the flow. In particular, we identify a naturalC-function that is a completely monotonic function of scale, meaning its derivatives satisfy the alternating inequalities (–1)ⁿC⁽ⁿ⁾(μ²) ≥ 0. The completely monotonicC-function is identical to the ZamolodchikovC-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 Zamolodchikovc-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 thec-theorem in two dimensions, and provides a second, simpler example of the Lorentzian sum rule. 

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2. Quantum codes, CFTs, and defects

   https://doi.org/10.1007/JHEP03(2023)017  

   Buican, Matthew; Dymarsky, Anatoly; Radhakrishnan, Rajath (March 2023, Journal of High Energy Physics)

   A<sc>bstract</sc> We give a general construction relating Narain rational conformal field theories (RCFTs) and associated 3d Chern-Simons (CS) theories to quantum stabilizer codes. Starting from an abelian CS theory with a fusion group consisting ofneven-order factors, we map a boundary RCFT to ann-qubit quantum code. When the relevant ’t Hooft anomalies vanish, we can orbifold our RCFTs and describe this gauging at the level of the code. Along the way, we give CFT interpretations of the code subspace and the Hilbert space of qubits while mapping error operations to CFT defect fields. 

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3. Scale and conformal invariance in 2d σ-models, with an application to $$\mathcal{N}$$ = 4 supersymmetry

   https://doi.org/10.1007/JHEP03(2025)056  

   Papadopoulos, Georgios; Witten, Edward (March 2025, Journal of High Energy Physics)

   A<sc>bstract</sc> By adapting previously known arguments concerning Ricci flow and thec-theorem, we give a direct proof that in a two-dimensional sigma-model with compact target space, scale invariance implies conformal invariance in perturbation theory. This argument, which applies to a general sigma-model constructed with a target space metric andB-field, is in accord with a more general proof in the literature that applies to arbitrary two-dimensional quantum field theories. Models with extended supersymmetry and aB-field are known to provide interesting test cases for the relation between scale invariance and conformal invariance in sigma-model perturbation theory. We give examples showing that in such models, the obstructions to conformal invariance suggested by general arguments can actually occur in models with target spaces that are not compact or complete. Thus compactness of the target space, or at least a suitable condition of completeness, is necessary as well as sufficient to ensure that scale invariance implies conformal invariance in models of this type. 

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4. Holographic description of Narain CFTs and their code-based ensembles

   https://doi.org/10.1007/JHEP05(2024)343  

   Aharony, Ofer; Dymarsky, Anatoly; Shapere, Alfred D (May 2024, Journal of High Energy Physics)

   A<sc>bstract</sc> We provide a precise relation between an ensemble of Narain conformal field theories (CFTs) with central chargec=n, and a sum of (U(1) × U(1))ⁿChern-Simons theories on different handlebody topologies. We begin by reviewing the general relation of additive codes to Narain CFTs. Then we describe a holographic duality between any given Narain theory and a pure Chern-Simons theory on a handlebody manifold. We proceed to consider an ensemble of Narain theories, defined in terms of an ensemble of codes of lengthnoverℤ_k × ℤ_kfor primek. We show that averaging over this ensemble is holographically dual to a level-k(U(1) × U(1))ⁿChern-Simons theory, summed over a finite number of inequivalent classes of handlebody topologies. In the limit of largekthe ensemble approaches the ensemble of all Narain theories, and its bulk dual becomes equivalent to “U(1)-gravity” — the sum of the pertubative part of the Chern-Simons wavefunction over all possible handlebodies — providing a bulk microscopic definition for this theory. Finally, we reformulate the sum over handlebodies in terms of Hecke operators, paving the way for generalizations. 

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5. Universal bounds on CFT Distance Conjecture

   https://doi.org/10.1007/JHEP12(2024)154  

   Ooguri, Hirosi; Wang, Yifan (December 2024, Journal of High Energy Physics)

   A<sc>bstract</sc> For any unitary conformal field theory in two dimensions with the central chargec, we prove that, if there is a nontrivial primary operator whose conformal dimension ∆ vanishes in some limit on the conformal manifold, the Zamolodchikov distancetto the limit is infinite, the approach to this limit is exponential ∆ = exp(−αt+O(1)), and the decay rate obeys the universal boundsc^−1/2≤α≤ 1. In the limit, we also find that an infinite tower of primary operators emerges without a gap above the vacuum and that the conformal field theory becomes locally a tensor product of a sigma-model in the large radius limit and a compact theory. As a corollary, we establish a part of the Distance Conjecture about gravitational theories in three-dimensional anti-de Sitter space. In particular, our bounds onαindicate that the emergence of exponentially light states is inevitable as the moduli field corresponding totrolls beyond the Planck scale along the steepest path and that this phenomenon can begin already at the curvature scale of the bulk geometry. We also comment on implications of our bounds for gravity in asymptotically flat spacetime by taking the flat space limit and compare with the Sharpened Distance Conjecture. 

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