Logarithmic limits of minimal models
Jorgen Rasmussen
TL;DR
The paper explores how certain limiting procedures in (super)conformal field theories can lead to the emergence of logarithmic (super)conformal field theories, with examples from minimal models and N=1 superconformal theories.
Contribution
It introduces a method to obtain logarithmic (super)conformal field theories as limits of minimal models, expanding understanding of their formation and properties.
Findings
Logarithmic limits of minimal models produce new logarithmic (super)conformal theories.
The construction is demonstrated in both conformal and N=1 superconformal field theories.
The approach provides insights into the structure and behavior of logarithmic theories.
Abstract
It is discussed how a limiting procedure of (super)conformal field theories may result in logarithmic (super)conformal field theories. The construction is illustrated by logarithmic limits of (unitary) minimal models in conformal field theory and in N=1 superconformal field theory.
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