AbstractWe study fusion rings for degenerate minimal models (p=q case) for N=0 and N=1 (super)conformal algebras. We consider a distinguished family of modules at the level c=1 and c=3/2 and show that the corresponding fusion rings are isomorphic to the representation rings for sl(2,C) and osp(1|2), respectively
AbstractLet Lcm be the vertex operator superalgebra associated to the unitary vacuum module for the ...
Abstract. Let g be a finite-dimensional complex simple Lie algebra with highest root θ. Given two no...
We study the category of finite-dimensional representations for a basic classical Lie superalgebra g...
AbstractWe study fusion rings for degenerate minimal models (p=q case) for N=0 and N=1 (super)confor...
We identify quotient polynomial rings isomorphic to the recently found fundamental fusion algebras o...
We study the minimal models associated to osp(1|2), otherwise known as the fractional-level Wess–Zum...
In this paper we present explicit results for the fusion of irreducible and higher rank representati...
Based on symmetry principles, we derive a fusion algebra generated from repeated fusions of the irre...
Abstract. We study the fusion rings of tilting modules for a quantum group at a root of unity modulo...
The countably infinite number of Virasoro representations of the logarithmic minimal model LM (p, p′...
We present explicit conjectures for the chiral fusion algebras of the logarithmic minimal models con...
We introduce the notion of (nondegenerate) strongly-modular fusion algebras. Here strongly-modular m...
Logarithmic conformal field theory is a relatively recent branch of mathematical physics w...
We prove that every slightly degenerate braided fusion category admits a minimal nondegenerate exten...
The fusion rings of the Wess-Zumino- Witten models are re-examined. Attention is drawn to the differ...
AbstractLet Lcm be the vertex operator superalgebra associated to the unitary vacuum module for the ...
Abstract. Let g be a finite-dimensional complex simple Lie algebra with highest root θ. Given two no...
We study the category of finite-dimensional representations for a basic classical Lie superalgebra g...
AbstractWe study fusion rings for degenerate minimal models (p=q case) for N=0 and N=1 (super)confor...
We identify quotient polynomial rings isomorphic to the recently found fundamental fusion algebras o...
We study the minimal models associated to osp(1|2), otherwise known as the fractional-level Wess–Zum...
In this paper we present explicit results for the fusion of irreducible and higher rank representati...
Based on symmetry principles, we derive a fusion algebra generated from repeated fusions of the irre...
Abstract. We study the fusion rings of tilting modules for a quantum group at a root of unity modulo...
The countably infinite number of Virasoro representations of the logarithmic minimal model LM (p, p′...
We present explicit conjectures for the chiral fusion algebras of the logarithmic minimal models con...
We introduce the notion of (nondegenerate) strongly-modular fusion algebras. Here strongly-modular m...
Logarithmic conformal field theory is a relatively recent branch of mathematical physics w...
We prove that every slightly degenerate braided fusion category admits a minimal nondegenerate exten...
The fusion rings of the Wess-Zumino- Witten models are re-examined. Attention is drawn to the differ...
AbstractLet Lcm be the vertex operator superalgebra associated to the unitary vacuum module for the ...
Abstract. Let g be a finite-dimensional complex simple Lie algebra with highest root θ. Given two no...
We study the category of finite-dimensional representations for a basic classical Lie superalgebra g...
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