Anisotropic scaling limits of long-range dependent linear random fields on Z3

Abstract

We provide a complete description of anisotropic scaling limits of stationary linear random field on Z3 with long-range dependence and moving average coefficients decaying as O(|ti|-qi) in the ith direction, i=1,2,3. The scaling limits are taken over rectangles in Z3 whose sides increase as O(λγi), i=1,2,3 when λ ∞, for any fixed γi >0, i=1,2,3 . We prove that all these limits are Gaussian RFs whose covariance structure essentially is determined by the fulfillment or violation of the balance conditions γi qi = γj qj, 1 i < j 3. The paper extends recent results in ps2015, ps2016, pils2016, pils2017 on anisotropic scaling of long-range dependent random fields from dimension 2 to dimension 3.