For a sparse non-singular matrix A, generally A −1 is a dense matrix. However, for a class of matrices, A −1 can be a matrix with off-diagonal decay properties, i.e., |A ij −1| decays fast to 0 with respect to the increase of a properly defined distance between i and j. Here we consider the off-diagonal decay properties of discretized Green’s functions for Schrodinger type operators. We provide decay estimates for discretized Green’s functions obtained from the finite difference discretization, and from a variant of the pseudo-spectral discretization. The asymptotic decay rate in our estimate is independent of the domain size and of the discretization parameter. We verify the decay estimate with numerical results for one-dimensional Schrodinger type operators.