Scaling transition for singular linear random fields on Z2: spectral approach

Abstract

We study partial sums limits of linear random fields X on Z2 with spectral density f( x) tending to ∞,\, 0 or to both (along different subsequences) as x (0,0). The above behaviors are termed (spectrum) long-range dependence, negative dependence, and long-range negative dependence, respectively, and assume an anisotropic power-law form of f( x) near the origin. The partial sums are taken over rectangles whose sides increase as λ and λγ , for any fixed γ >0. We prove that for above X the partial sums or scaling limits exist for any γ>0 and exhibit a scaling transition at some γ = γ0>0; moreover, the `unbalanced' scaling limits (γγ0) are Fractional Brownian Sheet with Hurst parameters taking values from [0,1]. The paper extends ps2015, pils2017, sur2020 to the above spectrum dependence conditions and/or more general values of Hurst parameters.