- Di#erential equations and conformal field theories
- Vertex operator algebras, fusion rules and modular transformations
- On the concepts of intertwining operator and tensor product module in vertex operator algebra theory
- Logarithmic tensor product theory for generalized modules for a conformal vertex
- Differential equations and conformal field theories
- Differential equations and intertwining operators
- Modular invariance for conformal full field algebras
- Cofiniteness conditions, projective covers and the logarithmic tensor
- Rigidity and modularity of vertex tensor categories
- Full field algebras YiZhi Huang and Liang Kong
- Vertex operator algebras and the Verlinde conjecture
- Open-string vertex algebras, tensor categories and operads
- AN EQUIVALENCE OF TWO CONSTRUCTIONS OF PERMUTATIONTWISTED MODULES FOR LATTICE VERTEX
- Riemann surfaces with boundaries and the theory of vertex operator
- Openstring vertex algebras, tensor categories and operads
- Conformalfieldtheoretic analogues of codes and lattices
- A logarithmic generalization of tensor product theory for modules for a vertex
- Vertex operator algebras, the Verlinde conjecture and modular
- On the concepts of intertwining operator and tensor product module in vertex operator algebra theory
- Di#erential equations, duality and modular invariance
- Vertex operator algebras, fusion rules and modular transformations
- Riemann surfaces with boundaries and the theory of vertex operator
- Conformal-field-theoretic analogues of codes and lattices
- Vertex operator algebras, the Verlinde conjecture and modular
- Differential equations, duality and modular invariance
- Di#erential equations and intertwining operators
- Logarithmic tensor category theory, VIII: Braided tensor category structure on
- Logarithmic tensor category theory, VII: Convergence and extension properties and
- Quantum Hall systems Representation theory of vertex operator algebras Applications The end Quantum Hall states and the representation
- Eigenfunctions on a Riemannian manifold and representations of a vertex operator
- Quantum Hall systems Representation theory of vertex operator algebras Applications The end Quantum Hall states and the representation