The correlation function of \((1, 1)\) and \((2, 2)\) supersymmetric theories with \(T\overline{T}\) deformation
From MaRDI portal
Publication:780760
DOI10.1007/JHEP04(2020)100zbMath1436.81137arXiv1912.11461MaRDI QIDQ780760
Song He, Jia-Rui Sun, Yu-An Sun
Publication date: 15 July 2020
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1912.11461
Two-dimensional field theories, conformal field theories, etc. in quantum mechanics (81T40) Supersymmetric field theories in quantum mechanics (81T60) Groups and algebras in quantum theory and relations with integrable systems (81R12)
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Cites Work
- Unnamed Item
- Entanglement entropy, planar surfaces, and spectral functions
- Holographic local quenches and entanglement density
- Supercurrents and brane currents in diverse dimensions
- On space of integrable quantum field theories
- Large \(N\) phase transition in \( T\overline{T} \) -deformed \(2d\) Yang-Mills theory on the sphere
- Modular invariance and uniqueness of \( T\overline{T} \) deformed CFT
- The holographic interpretation of \( J\overline{T} \)-deformed CFTs
- Holography beyond AdS
- Introduction to conformal field theory. With applications to string theory
- The \( T\overline{T} \) deformation of quantum field theory as random geometry
- Generalised Born-Infeld models, Lax operators and the \(T\overline{T}\) perturbation
- \( \mathrm{T}\overline{\mathrm{T}} \)-deformed 2D quantum field theories
- A bound on chaos
- Moving the CFT into the bulk with \( T\overline{T}\)
- Entanglement of purification in free scalar field theories
- The \( T\overline{T} \) deformation at large central charge
- \( T\overline{T} \)-deformations in closed form
- \( \mathrm{T}\overline{\mathrm{T}} \) and LST
- Asymptotic fragility, near \(\mathrm{AdS}_{2}\) holography and \( T\overline{T} \)
- A solvable irrelevant deformation of \( \mathrm{AdS}_{3}/\mathrm{CFT}_{2}\)
- Background independent holographic dual to \( T\overline{T} \) deformed CFT with large central charge in 2 dimensions
- Finite cutoff \(\mathrm{AdS}_{5}\) holography and the generalized gradient flow
- Comments on \(T \overline{T}\) double trace deformations and boundary conditions
- The \(T\overline{T}\) perturbation and its geometric interpretation
- \( T\overline{T} \)-deformations, AdS/CFT and correlation functions
- \( T\overline{T} \) type deformation in the presence of a boundary
- \( T\overline{T} \) deformed partition functions
- \( T\overline{T} \) partition function from topological gravity
- Entanglement entropy for \textit{TT} deformed CFT in general dimensions
- \(T\overline{T}\)-deformed actions and (1,1) supersymmetry
- Entanglement entropy and \(T\overline{T}\) deformations beyond antipodal points from holography
- \(T\overline{T}\) deformation of correlation functions
- On \( T\overline{T} \) deformations and supersymmetry
- Cutoff \(\mathrm{AdS}_{3}\) versus the \( T\overline{T} \) deformation
- Holography at finite cutoff with a $T^2$ deformation
- Holographic integration of $T\overline{T}$ \& $J\overline{T}$ via $O(d,d)$
- Supersymmetry and \( T\overline{T} \) deformations
- Stringy effects in scrambling
- Finite temperature entanglement negativity in conformal field theory
- $\boldsymbol {T\overline{T}}$ , $\boldsymbol {J\overline{T}}$ , $\boldsymbol{T\overline{J}}$ and string theory
