December 7, 2007

We consider a long-range version of percolation, self-avoiding walk and the Ising model, which we shall introduce first.

Let D(x,y) denote the transition probabilities for some random walk on the hypercubic lattice Z^d. We want D to be translation invariant, symmetric, and invariant under rotations by 90 degrees.

Now consider the related long-range percolation model: For two lattice points x,y we let a bond {x,y} be occupied with probability z.D(x,y) (and otherwise vacant), where z is a percolation parameter. A quantity of interest is the probability G_z(x,y) that the lattice points x and y are connected with a path of open bonds.

Similarly, we have a self-avoiding walk model by conditioning the ordinary random walk with step distribution D not to intersect itself. For this model we let G_z(x,y) be the associated Green's function.

We finally consider a long-range Ising model, where the spin-spin interaction is related to D.

If D describes nearest-neighbor random walk (i.e., D(x,y)=1/(2d) for |x-y|=1 and 0 otherwise), then we obtain the (classical) nearest-neighbor versions of SAW, percolation, and the Ising model. These are well-understood in sufficiently high dimension through the work of Hara & Slade (1990,1992), and Sakai (2007).

In recent joint work with Remco van der Hofstad and Akira Sakai we consider the case where D(x,y) is of the order |x-y|^{-d-\alpha}. This is known as long-range interaction. As a main result we obtain mean-field behaviour for these models if d > 3.Min{2,\alpha} for percolation, and d > 2.Min{2,\alpha} for self-avoiding walk and the Ising model. The proof of this result is based on the lace expansion.

In the talk I will mainly concentrate on the percolation case, though the method works (to some extent) uniformly for all three models. I shall begin by discussing long-range percolation in general, and then discuss some aspects of the proof.
 

abstract:

We study metastability and nucleation for the two-dimensional lattice gas with Kawasaki dynamics at low temperature and low density. Let $\beta>0$ be the inverse temperature and let $\Lambda_\beta \subset Z^2$ be a large finite box with periodic boundary conditions whose size depends on $\beta$. Particles perform a simple exclusion process on $\Lambda_\beta$, but when they occupy neighboring sites they feel a binding energy $-U<0$ that slows down their dissociation (i.e., the dynamics follows a Metropolis algorithm with an attractive lattice gas Hamiltonian).

The initial configuration is chosen according to the grand-canonical Gibbs measure on $\Lambda_\beta$ with activity energy $\Delta\in (U,2U)$ conditioned on all the droplets being subcritical (i.e., at time zero the particle density equals $\rho = e^{-\Delta\beta}$ and no stable droplets appear). For large $\beta$, the system wants to nucleate because of the binding energy. We investigate how this nucleation takes place under the dynamics. The restriction $\Delta\in (U,2U)$ corresponds to the situation where the side length of the critical droplet $l_c = \lceil U/(2U-\Delta)\rceil$ is neither 1 nor $\infty$ (i.e., the system is metastable).
Since the density is low, the creation of critical droplets occurs roughly independently at different sites of $\Lambda_\beta$ and the nucleation is triggered by one critical droplet that appears after many unsuccessful attempts (i.e., the system shows homogeneous nucleation).

A key ingredient we use to approach the problem of metastability is the ideal gas approximation for a two-dimensional rarefied gas under Kawasaki dynamics. We show that, at fixed temperature and in the limit as the particle density tends to zero, such a gas evolves in a way that is close to an ideal gas, where particles have no interaction. In particular, we prove three theorems showing that particle trajectories are non-superdiffusive and have a diffusive spread-out property.
Our results are formulated in the more general context of systems of ``quasi random walks'', of which we show that the lattice gas under Kawasaki dynamics is an example. We are able to deal with a large class of initial conditions having no anomalous concentration of particles and with time horizons that are much larger than the typical particle collision time.