An algebraic approach to logarithmic conformal field theory
Matthias R Gaberdiel
TL;DR
This paper provides an algebraic framework for logarithmic conformal field theory, illustrating key examples like the c=-2 triplet and affine su(2) theories, and discusses Zhu's contributions.
Contribution
It introduces an algebraic approach to logarithmic conformal field theory and details specific models and Zhu's work, offering new insights into the structure of the field.
Findings
Detailed algebraic descriptions of the c=-2 triplet theory
Analysis of the k=-4/3 affine su(2) theory
Overview of Zhu's contributions to the field
Abstract
A comprehensive introduction to logarithmic conformal field theory, using an algebraic point of view, is given. A number of examples are explained in detail, including the c=-2 triplet theory and the k=-4/3 affine su(2) theory. We also give some brief introduction to the work of Zhu.
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