Logarithmic conformal field theory

In theoretical physics, a logarithmic conformal field theory is a conformal field theory in which the correlators of the basic fields are allowed to be logarithmic at short distance, instead of being powers of the fields' distance. Equivalently, the dilation operator is not diagonalizable.

Examples of logarithmic conformal field theories include critical percolation.

Just like conformal field theory in general, logarithmic conformal field theory has been particularly well-studied in two dimensions. Some two-dimensional logarithmic CFTs have been solved:

• The Gaberdiel–Kausch CFT at central charge ${\displaystyle c=-2}$, which is rational with respect to its extended symmetry algebra, namely the triplet algebra.
• The ${\displaystyle GL(1|1)}$Wess–Zumino–Witten model, based on the simplest non-trivial supergroup.
• The triplet model at ${\displaystyle c=0}$is also rational with respect to the triplet algebra.