A stationary point process is said to drive a model of continuum percolation theory if one of the characterizing axioms of the model hinges on the existence of . In this case, the model is said to be driven by .
Drive
See also
AB Percolation, Bernoulli Percolation Model, Bond Percolation, Boolean Model, Boolean-Poisson Model, Bootstrap Percolation, Cayley Tree, Cluster, Cluster Perimeter, Continuum Percolation Theory, Dependent Percolation, Discrete Percolation Theory, Disk Model, First-Passage Percolation, Germ-Grain Model, Inhomogeneous Percolation Model, Lattice Animal, Long-Range Percolation Model, Mixed Percolation Model, Oriented Percolation Model, Percolation, Percolation Theory, Percolation Threshold, Polyomino, Random-Cluster Model, Random-Connection Model, Random Walk, s-Cluster, s-Run, Site PercolationThis entry contributed by Christopher Stover
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References
Meester, R. and Roy, R. Continuum Percolation. New York: Cambridge University Press, 2008.Cite this as:
Stover, Christopher. "Drive." From MathWorld--A Wolfram Web Resource, created by Eric W. Weisstein. https://mathworld.wolfram.com/Drive.html