Representations of the vertex operator algebra \(V^{A_4}_{L_2}\)
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Publication:371394
DOI10.1016/J.JALGEBRA.2012.12.004zbMath1292.17020arXiv1209.1168OpenAlexW2963183657MaRDI QIDQ371394
Chongying Dong, Cuipo (Cuibo) Jiang
Publication date: 9 October 2013
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1209.1168
Related Items (12)
Representations of \(\mathbb{Z}_2\)-orbifold of the parafermion vertex operator algebra \(K(sl_{2},k)\) ⋮ A Characterization of the Vertex Operator Algebra $$V _{L_{2}}^{A_{4}}$$ ⋮ Modular quasi-Hopf algebras and groups with one involution ⋮ Orbifold theory of the affine vertex operator superalgebra \(L_{\widehat{osp (1|2)}}(k, 0)\) ⋮ A characterization of the rational vertex operator algebra \(V_{\mathbb Z{\alpha}}^+\). II ⋮ Fusion rules for \(\mathbb{Z}_2\)-orbifolds of affine and parafermion vertex operator algebras ⋮ Permutation Orbifolds of Rank Three Fermionic Vertex Superalgebras ⋮ Fusion rules for the vertex operator algebra \(V_{L_2}^{A_4}\) ⋮ Representations of the orbifold VOAS \(L_{\widehat{\mathfrak{sl}_2}}(k,0)^K\) and the commutant VOAS \(C_{{L_{\widehat{\mathfrak{so}_m}}(1,0)}^{\otimes 3}}({L_{\widehat{\mathfrak{so}_m}}(3,0)})\) ⋮ Representations and fusion rules for the orbifold vertex operator algebras Lsl2̂(k,0)Zp ⋮ ADE SUBALGEBRAS OF THE TRIPLET VERTEX ALGEBRA $\mathcal{W}(p)$: A-SERIES ⋮ Unnamed Item
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