Kenneth S. Alexander
Mixing Properties and Exponential Decay for Lattice Systems in Finite Volumes
(142K, AMS LaTeX)
ABSTRACT. An infinite-volume mixing or exponential-decay property in a spin system
or percolation model reflects the inability of the influence of the
configuration in one region to propagate to distant regions, but in some
circumstances where such properties hold, propagation can nonetheless occur in finite volumes endowed with boundary conditions. We establish the absense of such propagation, particularly in two dimensions in finite volumes which are simply connected, under a variety of conditions, mainly for the Potts model and the Fortuin-Kasteleyn (FK) random cluster model, allowing external fields. For example, for the FK model in two dimensions we show that exponential decay of
connectivity in infinite volume implies exponential decay in simply connected finite volumes, uniformly over all such volumes and all boundary conditions, and implies a strong mixing property for such volumes with certain types of boundary
conditions. For the Potts model in two dimensions
we show that exponential decay
of correlations in infinite volume implies a strong mixing property in simply connected finite volumes, which includes exponential decay of correlations in simply connected finite volumes, uniformly over all such volumes and all boundary conditions.