Classification of Kac representations in the logarithmic minimal models \(LM(1,p)\)
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Publication:659333
DOI10.1016/j.nuclphysb.2011.07.026zbMath1229.81269arXiv1012.5190OpenAlexW2047317809MaRDI QIDQ659333
Publication date: 18 January 2012
Published in: Nuclear Physics. B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1012.5190
Two-dimensional field theories, conformal field theories, etc. in quantum mechanics (81T40) Yang-Baxter equations (16T25)
Related Items (15)
Fusion rules for the logarithmicN= 1 superconformal minimal models: I. The Neveu–Schwarz sector ⋮ Log-modular quantum groups at even roots of unity and the quantum Frobenius I ⋮ Critical dense polymers with Robin boundary conditions, half-integer Kac labels and \(\mathbb{Z}_4\) fermions ⋮ Fock space realisations of staggered modules in 2D logarithmic CFTs ⋮ A physical approach to the classification of indecomposable Virasoro representations from the blob algebra ⋮ Kazhdan-Lusztig equivalence and fusion of Kac modules in Virasoro logarithmic models ⋮ NGK and HLZ: Fusion for Physicists and Mathematicians ⋮ Staggered and affine Kac modules over \(A_1^{(1)}\) ⋮ Refined conformal spectra in the dimer model ⋮ Logarithmic superconformal minimal models ⋮ Fusion hierarchies,T-systems, andY-systems of logarithmic minimal models ⋮ Logarithmic minimal models with Robin boundary conditions ⋮ Boundary algebras and Kac modules for logarithmic minimal models ⋮ Yang–Baxter integrable dimers on a strip ⋮ Fusion rules for the logarithmic \(N\)=1 superconformal minimal models. II: Including the Ramond sector
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