Recurrence relations for toric \(N=1\) superconformal blocks
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Publication:1795997
DOI10.1007/JHEP09(2012)122zbMath1397.81310arXiv1207.5740OpenAlexW3105237917MaRDI QIDQ1795997
Zbigniew Jaskólski, Leszek Hadasz, Paulina Suchanek
Publication date: 16 October 2018
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1207.5740
Related Items (6)
On new exact conformal blocks and Nekrasov functions ⋮ Exact partition functions for deformed \( \mathcal{N}=2 \) theories with \( {\mathcal{N}}_f=4 \) flavours ⋮ Recursive representations of arbitrary Virasoro conformal blocks ⋮ Large-\(c\) superconformal torus blocks ⋮ C-recursion for multi-point superconformal blocks. NS sector ⋮ Conformal blocks of chiral fields in \( \mathcal{N}=2 \) SUSY CFT and affine laumon spaces
Cites Work
- Recursive representation of the torus 1-point conformal block
- On AGT conjecture
- Elliptic recursion for 4-point superconformal blocks and bootstrap in \(N = 1\) SLFT
- Braiding and fusion properties of the Neveu-Schwarz super-conformal blocks
- On the fusion matrix of the \(N = 1\) Neveu-Schwarz blocks
- Ramond sector of super Liouville theory from instantons on an ALE space
- Super Liouville conformal blocks from \( \mathcal{N} = 2 \) SU(2) quiver gauge theories
- Instantons on ALE spaces and super Liouville conformal field theories
- Instantons and 2d superconformal field theory
- Norm of logarithmic primary of Virasoro algebra
- Classical geometry from the quantum Liouville theory
- Elliptic recurrence representation of the \(N=1\) Neveu-Schwarz blocks
- On the \(N=1\) super Liouville four-point functions
- Unitary representations of the Virasoro and super-Virasoro algebras
- Infinite conformal symmetry in two-dimensional quantum field theory
- Structure constants in the \(N=1\) super-Liouville field theory
- Two- and three-point functions in Liouville theory
- Highest weight representations of the \(N=1\) Ramond algebra
- Conformal bootstrap in Liouville field theory
- Gauge theories on ALE space and super Liouville correlation functions
- Instanton moduli spaces and bases in coset conformal field theory
- Braiding properties of the \(N = 1\) super-conformal blocks (Ramond sector)
- Proving the AGT relation for \(N_{f} = 0, 1, 2\) antifundamentals
- Bootstrap in supersymmetric Liouville field theory. I: NS sector
- \(N=1\) supersymmetric conformal block recursion relations
- Liouville theory and uniformization of four-punctured sphere
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