Two-point cluster function for continuum percolation

Abstract

We introduce a two‐point cluster function C₂(r₁,r₂) which reflects information about clustering in general continuum–percolation models. Specifically, for any two‐phase disordered medium, C₂(r₁,r₂) gives the probability of finding both points r₁ and r₂ in the same cluster of one of the phases. For distributions of identical inclusions whose coordiantes are fully specified by center‐of‐mass positions (e.g., disks, spheres, oriented squares, cubes, ellipses, or ellipsoids, etc.), we obtain a series representation of C₂ which enables one to compute the two‐point cluster function. Some general asymptotic properties of C₂ for such models are discussed. The two‐point cluster function is then computed for the adhesive‐sphere model of Baxter. The two‐point cluster function for arbitrary media provides a better signature of the microstructure than does a commonly employed two‐point correlation function defined in the text.