Open problems in 2d CFT

1. Is diffusion-limited aggregation in two dimensions conformally invariant? If yes, which CFT describes it?

2. Which CFT describes KPZ surface growth?

3. Which CFT describes the infrared limit of ${\displaystyle N}$  coupled ${\displaystyle Q}$ -state Potts models in 2d, coupled by the energy, with ${\displaystyle N\neq 1,2}$  and ${\displaystyle 2<Q<4}$ ?

4. For compact unitary Virasoro-CFTs with ${\displaystyle c>1}$ , which values of the central charge ${\displaystyle c}$  are possible?

5. Are there compact unitary CFTs with ${\displaystyle c\in \mathbb {Q} }$  that are neither rational, nor exactly marginal deformations of rational CFTs?

6. Are there exactly solvable non-diagonal Virasoro-CFTs with ${\displaystyle c\geq 25}$ ? See Virasoro CFTs with a large central charge.

• Virasoro conformal blocks at rational central charge.

• Prove Zamolodchikov's recursive representation of w:Virasoro conformal blocks. (See Section 4.3 of ref.^[1]) Related issue: prove the convergence of Virasoro conformal blocks.

• Define an interchiral algebra that leads to the known interchiral representations and interchiral conformal blocks. (See Section 4.2 of ref.^[1])

• Compute the fusion product of representations of the affine Lie algebra ${\displaystyle {\hat {\mathfrak {s\ell }}}_{2}}$ , including the representations that appear in the ${\displaystyle SL_{2}(\mathbb {R} )}$  w:Wess-Zumino-Witten model, and the degenerate representations needed to bootstrap that model. (See Section 4.4.3 of ref.^[2] and ref.^[3])

• Boundary Liouville theory with ${\displaystyle c\leq 1}$ .

• Conformal Toda theory.

• Generalized D-series minimal models, i.e. non-rational limits of D-series minimal models, see Solvable non-diagonal 2d CFTs.

• Solving the SL(2,R) WZW model.

• Logarithmic minimal models are believed to exist at rational central charges, with primary fields in the extended Kac table. They might be constructed as limits of generalized minimal models.^[4]

• Computing entanglement entropy in 2d CFTs.