Supergravity backgrounds of the \(\eta\)-deformed \(\mathrm{AdS}_{2} \times S^2 \times T^6\) and \(\mathrm{AdS}_{5} \times S^5\) superstrings
From MaRDI portal
Publication:667205
DOI10.1007/JHEP01(2019)125zbMath1409.83210arXiv1811.07841MaRDI QIDQ667205
Publication date: 12 March 2019
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1811.07841
String and superstring theories in gravitational theory (83E30) Supergravity (83E50) Groups and algebras in quantum theory and relations with integrable systems (81R12)
Related Items (25)
Bosonic \(\eta\)-deformed \( \mathrm{AdS}_4 \times \mathbb{CP}^3\) background ⋮ Integrable deformations of sigma models ⋮ Lax pairs for new \(\mathbb{Z}_N\)-symmetric coset \(\sigma\)-models and their Yang-Baxter deformations ⋮ Integrable deformation of \(\mathbb{CP}^n\) and generalised Kähler geometry ⋮ S matrix for a three-parameter integrable deformation of \( \mathrm{AdS}_3 \times S^3\) strings ⋮ Dual description of \(\eta\)-deformed OSP sigma models ⋮ The twisted story of worldsheet scattering in \(\eta\)-deformed \(\mathrm{AdS}_5 \times S^5\) ⋮ Bi-\(\eta\) and bi-\(\lambda\) deformations of \(\mathbb{Z}_4\) permutation supercosets ⋮ Integrable supersymmetric deformations of \(\mathrm{AdS}_3\times\mathrm{S}^3\times\mathrm{T}^4\) ⋮ Supersymmetric solutions of type-II supergravity from \(\lambda\)-deformations and zoom-in limits ⋮ Poisson-Lie T-duality defects and target space fusion ⋮ Universal 1-loop divergences for integrable sigma models ⋮ Supersymmetric backgrounds from \(\lambda\)-deformations ⋮ Integrable bootstrap for \(\mathrm{AdS}_3/ \mathrm{CFT}_2\) correlation functions ⋮ Three-parameter deformation of \(\mathbb{R} \times S^3\) in the Landau-Lifshitz limit ⋮ On the stability of AdS backgrounds with \(\lambda \)-deformed factors ⋮ On quantum deformations of \(\mathrm{AdS}_3 \times S^3 \times T^4\) and mirror duality ⋮ Non-abelian fermionic T-duality in supergravity ⋮ String backgrounds of the Yang-Baxter deformed \( \mathrm{AdS}_4 \times \mathbb{C} \mathbb{P}^3\) superstring ⋮ Two-parameter integrable deformations of the \(\mathrm{AdS}_{3} \times S^3 \times T^4\) superstring ⋮ Integrable sigma models and 2-loop RG flow ⋮ Bethe ansatz for quantum-deformed strings ⋮ Homogeneous Yang-Baxter deformations as undeformed yet twisted models ⋮ Yang-Baxter deformations of the flat space string ⋮ Yang–Baxter deformations and generalized supergravity—a short summary
Cites Work
- Unnamed Item
- Unnamed Item
- Scale invariance of the \(\eta\)-deformed \(\mathrm{AdS}_{5} \times S^{5}\) superstring, T-duality and modified type II equations
- Superisometries and integrability of superstrings
- Derivation of the action and symmetries of the \(q\)-deformed \({\mathrm{AdS}}_5\times S^5\) superstring
- The type II superstring to order \(\theta^{4}\)
- The classical exchange algebra of \(AdS_{5} \times S^{5}\) string theory
- Integrability of the bi-Yang-Baxter \(\sigma\)-model
- Three-parameter integrable deformation of \(\mathbb Z_4\) permutation supercosets
- On classical \(q\)-deformations of integrable \(\sigma\)-models
- What is a classical r-matrix?
- Supergravity backgrounds for deformations of \(\operatorname{AdS}_n \times \operatorname{S}^n\) supercoset string models
- Towards a two-parameter \(q\)-deformation of \(\mathrm{AdS}_3 \times S^3 \times M^4\) superstrings
- On integrable deformations of superstring sigma models related to \(\mathrm{AdS}_n \times \mathrm{S}^n\) supercosets
- Pohlmeyer reduction of \(\text{AdS}_5\times S^5\) superstring sigma model
- A q-difference analogue of \(U({\mathfrak g})\) and the Yang-Baxter equation
- Type IIB superstring action in \(\text{AdS}_5\times S^5\) background
- Remarks on non-abelian duality
- Superstring theory on \(\text{AdS}_2\times S^2\) as a coset supermanifold
- \(T\)-duality in the Green-Schwarz formalism, and the massless/massive IIA duality map
- Poisson-Lie \(T\)-duality and loop groups of Drinfeld doubles.
- Target space supergeometry of \(\eta\) and \(\lambda\)-deformed strings
- Yang-Baxter sigma models and Lax pairs arising from \(\kappa\)-Poincaré \(r\)-matrices
- Kappa-symmetry of superstring sigma model and generalized 10d supergravity equations
- On pp wave limit for \(\eta\) deformed superstrings
- Quantum spectral curve for the \(\eta\)-deformed \(\mathrm{AdS}_{5} \times S^{5}\) superstring
- Doubled aspects of generalised dualities and integrable deformations
- Non-abelian T-duality and Yang-Baxter deformations of Green-Schwarz strings
- Poisson-Lie duals of the \(\eta\)-deformed \(\mathrm{AdS}_{2} \times S^2 \times T^6\) superstring
- B-field in \(\mathrm{AdS}_3\)/\(\mathrm{CFT}_2\) correspondence and integrability
- Integrable deformations of the \(\text{O}(3)\) sigma model. The sausage model
- On non-abelian duality
- Courant algebroids, Poisson-Lie T-duality, and Type II supergravities
- \(q\)-deformation of the \(\operatorname{AdS}_{5} \times \operatorname{S}^{5}\) superstring S-matrix and its relativistic limit
- The classical \(R\)-matrix of AdS/CFT and its Lie dialgebra structure
- Strings on semisymmetric superspaces
- The exact spectrum and mirror duality of the \((\mathrm{AdS}_5\times S^5)_\eta\) superstring
- Double Wick rotating Green-Schwarz strings
- STRINGS IN SPACE-TIME COTANGENT BUNDLE AND T-DUALITY
- Onq-deformed symmetries as Poisson–Lie symmetries and application to Yang–Baxter type models
- On integrability of the Yang–Baxter σ-model
- Superstrings in AdS2×S2×T6
- Non-split and split deformations of ${\mathrm{AdS}}_{5}$
- Weyl invariance for generalized supergravity backgrounds from the doubled formalism
- Quantum deformations of the one-dimensional Hubbard model
- Foundations of the AdS5× S5superstring: I
- Penrose limits and maximal supersymmetry
- On dilaton dependence of type II superstring action
- Poisson-Lie \(T\)-duality
- Poisson-Lie duality in the string effective action
This page was built for publication: Supergravity backgrounds of the \(\eta\)-deformed \(\mathrm{AdS}_{2} \times S^2 \times T^6\) and \(\mathrm{AdS}_{5} \times S^5\) superstrings
