Upper critical dimension of the 3-state Potts model

Abstract

We consider the 3-state Potts model in d≥2 dimensions. For d less than the upper critical dimension dcrit, the model has a critical and a tricritical fixed point. In d=2, these fixed points are described by minimal models, and so are exactly solvable. For d>2, however, strong coupling makes them difficult to study and there is no consensus on the value of dcrit. We use the numerical conformal bootstrap to compute critical exponents of both the critical and tricritical fixed points for general d. In d=2 our results match the expected values, and as we increase d we find that the critical exponents of each fixed point get closer until they merge near dcrit 2.5.