![]() Turner, spatstat: an R package for analyzing spatial point patterns. Blaszczyszyn, Stochastic geometry and wireless networks II: applications. Blaszczyszyn, Stochastic geometry and wireless networks I: theory. Swinney, An invariant distribution in static granular media. Di Matteo, Emergence of Gamma distributions in granular materials and packing models. Alesker, Description of continuous isometry covariant valuations on convex sets. Alesker, Continuous rotation invariant valuations on convex sets. Wainwright, Phase transition for a hard sphere system. ![]() This process is experimental and the keywords may be updated as the learning algorithm improves.ī.J. These keywords were added by machine and not by the authors. Therefore, given a realization of a tessellation (e.g., an experimental image), these shape indices are able to narrow the choice of possible generating processes, providing a powerful tool which can be further strengthened by considering density-resolved volume-shape correlations. However, we identify significant differences of these shape indices between many of the tessellation models listed above. We find that, not surprisingly, the indices 〈 V 〉 2∕〈 A〉 3 and 〈 β 1 0,2〉 are not sufficient to unambiguously identify the generating process even amongst this limited set of processes. These data are complemented by experimental 3D image data of mechanically stable ellipsoid configurations, area-minimising liquid foam models, and mechanically stable crystalline sphere configurations. Simulation data for these quantities, as well as for distributions thereof and for correlations of cell shape and cell volume, are presented for Voronoi mosaics of the Poisson point process, determinantal and permanental point processes, Gibbs hard-core processes of spheres, and random sequential absorption processes as well as for Laguerre tessellations of configurations of polydisperse spheres, STIT-tessellations, and Poisson hyperplane tessellations. We focus on the relationship between two indices: (1) the dimensionless ratio 〈 V 〉 2∕〈 A〉 3 of empirical average cell volumes to areas, and (2) the degree of cell elongation quantified by the eigenvalue ratio 〈 β 1 0,2〉 of the interface Minkowski tensors W 1 0,2. This chapter addresses this question by a theory-based simulation study of cell shape indices derived from tensor-valued intrinsic volumes, or Minkowski tensors, for a variety of common tessellation models. In the context of applied image analysis of structured synthetic and biological materials, this question is central to the problem of inferring information about the formation process from spatial measurements of the resulting random structure. To which degree are shape indices of individual cells of a tessellation characteristic for the stochastic process that generates them? Within the context of stochastic geometry and the physics of disordered materials, this corresponds to the question of relationships between different stochastic processes and models.
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