Geometric Exponents, SLE and Logarithmic Minimal Models

In statistical mechanics, observables are usually related to local degrees of freedom such as the Q < 4 distinct states of theQ-state Potts models or the heights of the restricted solid-on-solid models. In the continuum scaling limit, these models are described by rational conformal field theories, namely the minimal models M(p, p ′) for suitable p, p ′. More generally, as in stochastic Loewner evolution (SLEκ), one can consider observables related to nonlocal degrees of freedom such as paths or boundaries of clusters. This leads to fractal dimensions or geometric exponents related to values of conformal dimensions not found among the finite sets of values allowed by the rational minimal models. Working in the context of a loop gas with loop fugacity β = −2 cos 4π κ , we use Monte Carlo simulations to measure the fractal dimensions of various geometric objects such as paths and the generalizations of cluster mass, cluster hull, external perimeter and red bonds. Specializing to the case where the SLE parameter κ = 4p ′ p is rational with p < p ′, we argue that the geometric exponents are related to conformal dimensions found in the infinitely extended Kac tables of the logarithmic minimal models LM(p, p ′). These theories describe lattice systems with nonlocal degrees of freedom. We present results for critical dense polymers LM(1, 2), critical percolation LM(2, 3), the logarithmic Ising model LM(3, 4), the logarithmic tricritical Ising model LM(4, 5) as well as LM(3, 5). Our results are compared with rigourous results from SLEκ, with predictions from theoretical physics and with other numerical experiments. Throughout, we emphasize the relationships between SLEκ, geometric exponents and the conformal dimensions of the underlying CFTs.