Searching for surface defect CFTs within \( \mathrm{AdS}_3\)
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Publication:2658129
DOI10.1007/JHEP11(2020)052zbMath1456.81373arXiv2007.16167OpenAlexW3102532458MaRDI QIDQ2658129
Federico Faedo, Yolanda Lozano, Nicolò Petri
Publication date: 18 March 2021
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2007.16167
Two-dimensional field theories, conformal field theories, etc. in quantum mechanics (81T40) Geometrodynamics and the holographic principle (83E05) String and superstring theories; other extended objects (e.g., branes) in quantum field theory (81T30)
Related Items (21)
\( \mathrm{AdS}_2\) geometries and non-abelian T-duality in non-compact spaces ⋮ New \( \mathrm{AdS}_2\) supergravity duals of 4d SCFTs with defects ⋮ Line defects as brane boxes in Gaiotto-Maldacena geometries ⋮ \(\mathrm{AdS}_3\) vacua realising \(\mathfrak{osp}(n|2)\) superconformal symmetry ⋮ On type IIA \(AdS_3\) solutions and massive GK geometries ⋮ On generalised D1-D5 near horizons and their spectra ⋮ New \(\mathrm{AdS}_3/\mathrm{CFT}_2\) pairs in massive IIA with \((0, 4)\) and \((4, 4)\) supersymmetries ⋮ \(N = (2, 0)\) \(\mathrm{AdS}_3\) solutions of M-theory ⋮ New IIB intersecting brane solutions yielding supersymmetric \( \mathrm{AdS}_3\) vacua ⋮ \( \mathrm{AdS}_3\) from M-branes at conical singularities ⋮ \(\mathrm{AdS}_2\) duals to ADHM quivers with Wilson lines ⋮ New \(\mathrm{AdS}_2\) backgrounds and \(\mathcal{N} = 4\) conformal quantum mechanics ⋮ New \(\mathcal{N} = (0, 4)\) \(\mathrm{AdS}_3\) near-horizons in type IIB ⋮ \(\mathrm{AdS}_2 \times S^2 \times \mathrm{CY}_2\) solutions in type IIB with 8 supersymmetries ⋮ Surface defects in holographic 5d SCFTs ⋮ Marginal deformations of a class of \( \mathrm{AdS}_3 \) \( \mathcal{N} = (0, 4)\) holographic backgrounds ⋮ All \(\mathcal{N} = (8, 0) \) \( \mathrm{AdS}_3\) solutions in 10 and 11 dimensions ⋮ \(\mathcal{N} = (2, 2)\) \(\mathrm{AdS}_3\) from D3-branes wrapped on Riemann surfaces ⋮ \(\mathcal{N} = (1, 1)\) supersymmetric \(\mathrm{AdS}_3\) in 10 dimensions ⋮ \(\mathrm{AdS}_3\times\mathrm{S}^2\) in IIB with small \(\mathcal{N} = (4, 0)\) supersymmetry ⋮ The conformal brane-scan: an update
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