# On four-point connectivities in the critical 2d Potts model

**Authors:** Marco Picco, Sylvain Ribault, Raoul Santachiara

arXiv: 1906.02566 · 2019-10-09

## TL;DR

This paper uses Monte Carlo simulations to study four-point connectivities in the critical 2D Potts model for non-integer Q, comparing results with conformal field theory predictions and exploring analytic continuations.

## Contribution

It provides the first detailed comparison between Monte Carlo results and CFT predictions for non-integer Q in the 2D Potts model, suggesting exact agreement only at specific Q values.

## Key findings

- Three connectivity combinations match CFT results to 2-4 digits.
- Agreement with CFT is exact at Q=0, 3, 4.
- Proposes analytic continuation of the Potts model in the central charge.

## Abstract

We perform Monte-Carlo computations of four-point cluster connectivities in the critical 2d Potts model, for numbers of states $Q\in (0,4)$ that are not necessarily integer. We compare these connectivities to four-point functions in a CFT that interpolates between D-series minimal models. We find that 3 combinations of the 4 independent connectivities agree with CFT four-point functions, down to the $2$ to $4$ significant digits of our Monte-Carlo computations. However, we argue that the agreement is exact only in the special cases $Q=0, 3, 4$. We conjecture that the Potts model can be analytically continued to a double cover of the half-plane $\{\Re c <13\}$, where $c$ is the central charge of the Virasoro symmetry algebra.

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Source: https://tomesphere.com/paper/1906.02566