Radial Covariance Functions Motivated by Spatial Random Field Models with Local Interactions

Abstract

We derive explicit expressions for a family of radially symmetric, non-differentiable, Spartan covariance functions in R2 that involve the modified Bessel function of the second kind. In addition to the characteristic length and the amplitude coefficient, the Spartan covariance parameters include the rigidity coefficient η1 which determines the shape of the covariance function. If η1 >> 1 Spartan covariance functions exhibit multiscaling. We also derive a family of radially symmetric, infinitely differentiable Bessel-Lommel covariance functions valid in Rd, d 2. We investigate the parametric dependence of the integral range for Spartan and Bessel-Lommel covariance functions using explicit relations and numerical simulations. Finally, we define a generalized spectrum of correlation scales λ(α)c in terms of the fractional Laplacian of the covariance function; for 0 α 1 the λ(α)c extend from the smoothness microscale (α=1) to the integral range (α=0). The smoothness scale of mean-square continuous but non-differentiable random fields vanishes; such fields, however, can be discriminated by means of λ(α)c scales obtained for α <1.