Finite range Decomposition of Gaussian Processes
Abstract
Let be the finite difference Laplacian associated to the lattice d. For dimension d 3, a 0 and L a sufficiently large positive dyadic integer, we prove that the integral kernel of the resolvent Ga:=(a-)-1 can be decomposed as an infinite sum of positive semi-definite functions Vn of finite range, Vn (x-y) = 0 for |x-y| O(L)n. Equivalently, the Gaussian process on the lattice with covariance Ga admits a decomposition into independent Gaussian processes with finite range covariances. For a=0, Vn has a limiting scaling form L-n(d-2)c, (x-yLn) as n ∞. As a corollary, such decompositions also exist for fractional powers (-)-α/2, 0<α ≤ 2. The results of this paper give an alternative to the block spin renormalization group on the lattice.
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