On a class of rational matrices and interpolating polynomials related to the discrete Laplace operator

Abstract

Let be the discrete Laplace operator acting on functions (or rational matrices) f:QL, where QL is the two dimensional lattice of size L embedded in Z2. Consider a rational L× L matrix H, whose inner entries Hij satisfy ij=0. The matrix H is thus the classical finite difference five-points approximation of the Laplace operator in two variables. We give a constructive proof that H is the restriction to QL of a discrete harmonic polynomial in two variables for any L>2. This result proves a conjecture formulated in the context of deterministic fixed-energy sandpile models in statistical mechanics.