Scaling transition and edge effects for negatively dependent linear random fields on Z2

Abstract

We obtain a complete description of anisotropic scaling limits and the existence of scaling transition for a class of negatively dependent linear random fields on Z2 with moving-average coefficients a(t,s) decaying as |t|-q1 and |s|-q2 in the horizontal and vertical directions, q1-1 + q2-1 < 1 . The scaling limits are taken over rectangles whose sides increase as λ and λγ when λ ∞, for any γ >0. We prove that the scaling transition %and the structure of the scaling diagram in this model is closely related to the presence or absence of the edge effects.