On A Finite Range Decomposition of the Resolvent of a Fractional Power of the Laplacian II. The Torus

Abstract

In previous papers, [M1, M2], [M3], we proved the existence as well as regularity of a finite range decomposition for the resolvent Gα (x-y,m2) = ((-)α 2 + m2)-1 (x-y) , for 0<α <2 and all real m, in the lattice Zd for dimension d 2. In this paper, which is a continuation of the previous one, we extend those results by proving the existence as well as regularity of a finite range decomposition for the same resolvent but now on the lattice torus Zd/LN+1 Zd for d 2 provided m≠ 0 and 0<α <2. We also prove differentiability and uniform continuity properties with respect to the resolvent parameter m2. Here L is any odd positive integer and N 2 is any positive integer.