Grothendieck ring and Verlinde-like formula for the {\cal W}-extended logarithmic minimal model {\cal WLM}(1,p)
From MaRDI portal
Publication:3407874
DOI10.1088/1751-8113/43/4/045211zbMath1186.81106arXiv0907.0134OpenAlexW3126038806MaRDI QIDQ3407874
No author found.
Publication date: 24 February 2010
Published in: Journal of Physics A: Mathematical and Theoretical (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0907.0134
Grothendieck groups, (K)-theory, etc. (16E20) Two-dimensional field theories, conformal field theories, etc. in quantum mechanics (81T40) (S)-matrix theory, etc. in quantum theory (81U20)
Related Items
The symplectic fermion ribbon quasi-Hopf algebra and the \(S L(2, \mathbb{Z})\)-action on its centre ⋮ Fusion rules for the logarithmicN= 1 superconformal minimal models: I. The Neveu–Schwarz sector ⋮ Logarithmic conformal field theory, log-modular tensor categories and modular forms ⋮ Graph fusion algebras of \({\mathcal WLM}((p,p')\) ⋮ Coset graphs in bulk and boundary logarithmic minimal models ⋮ Modular data and Verlinde formulae for fractional level WZW models I ⋮ Kazhdan-Lusztig equivalence and fusion of Kac modules in Virasoro logarithmic models ⋮ Modular transformations and Verlinde formulae for logarithmic (\(p_+,p_-\))-models ⋮ Staggered modules of \(N = 2\) superconformal minimal models ⋮ The non-semisimple Verlinde formula and pseudo-trace functions ⋮ Boundary algebras and Kac modules for logarithmic minimal models ⋮ Logarithmic Tensor Category Theory for Generalized Modules for a Conformal Vertex Algebra, I: Introduction and Strongly Graded Algebras and Their Generalized Modules
