Triviality of the scaling limits of critical Ising and 4 models with effective dimension at least four

Abstract

We prove that any scaling limit of a critical reflection positive Ising or 4 model of effective dimension deff at least four is Gaussian. This extends the recent breakthrough work of Aizenman and Duminil-Copin -- which demonstrates the corresponding result in the setup of nearest-neighbour interactions in dimension four -- to the case of long-range reflection positive interactions satisfying deff=4. The proof relies on the random current representation which provides a geometric interpretation of the deviation of the models' correlation functions from Wick's law. When d=4, long-range interactions are handled with the derivation of a criterion that relates the speed of decay of the interaction to two different mechanisms that entail Gaussianity: interactions with a sufficiently slow decay induce a faster decay at the level of the model's two-point function, while sufficiently fast decaying interactions force a simpler geometry on the currents which allows to extend nearest-neighbour arguments. When 1≤ d≤ 3 and deff=4, the phenomenology is different as long-range effects play a prominent role.