Hostname: page-component-cd9895bd7-jn8rn Total loading time: 0 Render date: 2024-12-23T16:10:20.923Z Has data issue: false hasContentIssue false
  • English
  • Français

Mean-Value Formulae for the Neighbourhood of the Typical Cell of a Random Tessellation

Part of: Geometric probability and stochastic geometry

Published online by Cambridge University Press:  01 July 2016

S. N. Chiu
S. N. Chiu*
Affiliation:
Freiberg University of Mining and Technology
*
* Postal address: TU Bergakademie Freiberg, Institut für Stochastik, D-09596 Freiberg, Germany. Supported by a DAAD scholarship. DAAD, Postfach 200 404, D-53134 Bonn, Germany.
Get access Rights & Permissions [Opens in a new window]

Abstract

The mean number of edges of a randomly chosen neighbouring cell of the typical cell in a planar stationary tessellation, under the condition that it has n edges, has been studied by physicists for more than 20 years. Experiments and simulation studies led empirically to the so-called Aboav's law. This law now plays a central role in Rivier's (1993) maximum entropy theory of statistical crystallography. Using Mecke's (1980) Palm method, an exact form of Aboav's law is derived. Results in higher-dimensional cases are also discussed.

Keywords

ABOAV'S LAWLEWIS'S LAWMEAN-VALUE FORMULAEMOSAICSNEIGHBOURHOODPALM DISTRIBUTIONRANDOM TESSELLATIONSSTATISTICAL CRYSTALLOGRAPHYSTOCHASTIC GEOMETRY

MSC classification

Primary: 60D05: Geometric probability and stochastic geometry
Type
Stochastic Geometry and Statistical Applications
Information
Advances in Applied Probability , Volume 26 , Issue 3 , September 1994 , pp. 565 - 576
Copyright
Copyright © Applied Probability Trust 1994 

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Aboav, D. A. (1970) The arrangement of grains in a polycrystal. Metallography 3, 383390.Google Scholar
Aboav, D. A. (1980) The arrangement of cells in a net. Metallography 13, 4358.Google Scholar
Aboav, D. A. (1983) The arrangement of cells in a net. II. Metallography 16, 256273.Google Scholar
Aboav, D. A. (1984) The arrangement of cells in a net. III. Metallography 17, 383396.Google Scholar
Aboav, D. A. (1985) The arrangement of cells in a net. IV. Metallography 18, 129147.Google Scholar
Aboav, D. A. (1987) Contiguous polygons in a random Voronoi tessellation–an approximate topological formula. Acta Stereol. 6/III, 371373.Google Scholar
Aboav, D. A. (1991) The stereology of the intergranular surface of a metal. Acta Stereol. 10, 4354.Google Scholar
Aboav, D. A. (1992) The topology of a polycrystal in three dimensions. Materials Science Forum 9496, 275280.Google Scholar
Blanc, M. and Mocellin, A. (1979) Grain coordination in plane sections of polycrystal. Acta Metallurgica 27, 12311237.Google Scholar
Boots, B. N. (1980) Packing polygons: some empirical evidence. Canadian Geographer 24, 406411.Google Scholar
Boots, B. N. (1982) The arrangement of cells in ‘random’ network. Metallography 15, 5362.Google Scholar
Boots, B. N. (1985) Further comments on ‘Aboav's rule’ for the arrangement of cells in a network. Metallography 18, 301303.Google Scholar
Boots, B. N. (1987) Edge length of properties of random Voronoi polygons. Metallography 20, 231236.Google Scholar
Boots, B. N. and Murdoch, D. J. (1983) The spatial arrangement of random Voronoi polygons. Computer and Geosc. 9, 351365.Google Scholar
Chiu, S. N. (1994a) Aboav-Weaire's and Lewis's Laws–a review. To appear.Google Scholar
Chiu, S. N. (1994b) A comment on Rivier's maximum entropy method of statistical crystallography. In preparation.Google Scholar
Cowan, R. (1978) The use of the ergodic theorems in random geometry. Suppl. Adv. Appl. Prob. 10, 4757.Google Scholar
Cowan, R. (1980) Properties of ergodic mosaic processes. Math. Nachr. 97, 89102.Google Scholar
Delannay, R., Le Caér, G. and Khatun, M. (1992) Random cellular structures generated from a 2D Ising ferromagnet. J. Phys. A: Math. Gen. 25, 61936210.Google Scholar
Fortes, M. A. and Andrade, P. N. (1989) The arrangement of cells in 3- and 4-regular planar networks formed by random straight lines. J. Physique 50, 717724.Google Scholar
Lambert, C. J. and Weaire, D. (1983) Order and disorder in two-dimensional random networks. Phil. Mag. B 47, 445450.Google Scholar
Le Caér, G. (1991a) Topological models of cellular structures. J. Phys. A: Math. Gen. 24, 13071317.Google Scholar
Le Caér, G. (1991b) Topological models of cellular structures: II, z ? 5. J. Phys. A: Math. Gen. 24, 46554675.Google Scholar
Le Caér, G. and Delannay, R. (1993a) The administrative divisions of mainland France as 2D random cellular structures. J. Physique I France 3, 17771800.Google Scholar
Le Caér, G. and Delannay, R. (1993b). Correlations in topological models of 2D random cellular structures. J. Phys. A: Math. Gen. 26, 39313954.Google Scholar
Le Caér, G. and Ho, J. S. (1990) The Voronoi tessellation generated from eigenvalues of complex random matrices. J. Phys. A: Math. Gen. 23, 32793295.Google Scholar
Lewis, F. T. (1928) The correlation between cell division and the shapes and sizes of prismatic cell in the epidermis of Cucumis. Anat. Rec. 38, 341376.Google Scholar
Lewis, F. T. (1930) A volumetric study of growth and cell division in two types of epithelium–the longitudinally prismatic cells of Tradescantia and the radially prismatic epidermal cells of Cucumis. Anat. Rec. 47, 5999.Google Scholar
Lewis, F. T. (1931) A comparison between the mosaic of polygons in a film of artificial emulsion and in cucumber epidermis and human amnion. Anat. Rec. 50, 235265.Google Scholar
Lewis, F. T. (1943) The geometry of growth and cell division in epithelial mosaics. Am. J. Bot. 30, 766776.Google Scholar
Lewis, F. T. (1944) The geometry of growth and cell division in columnar parenchyma. Am. J. Bot. 31, 619629.Google Scholar
Mecke, J. (1980) Palm methods for stationary random mosaics. In Combinatorial Principles in Stochastic Geometry, ed. Ambartzumian, A. V., pp. 124132. Armenian Academy of Science Publishing House, Erevan.Google Scholar
Møller, J. (1989) Random tessellation in. Adv. Appl. Prob. 21, 3773.Google Scholar
Mombach, J. C. M., De Almeida, R. M. C. and Iglesias, J. R. (1993a) Two-cell correlations in biological tissues. Phys. Rev. E 47, 37123716.Google Scholar
Mombach, J. C. M., De Almeida, R. M. C. and Iglesias, J. R. (1993b) Mitosis and growth in biological tissues. Phys. Rev. E 48, 598602.Google Scholar
Peshkin, M. A., Strandburg, K. J. and Rivier, N. (1991) Entropic predictions for cellular networks. Phys. Rev. Lett. 67, 18031806.Google Scholar
Pignol, V., Delannay, R. and Le Caér, G. (1993) Characterization of topological properties of 2D cellular structures by image analysis. To appear.Google Scholar
Rivier, N. (1985) Statistical crystallography. Structure of random cellular networks. Phil. Mag. B 52, 795819.Google Scholar
Rivier, N. (1993) Order and disorder in packing and froths. In Disorder and Granular Media, ed. Bideau, D. and Hansen, A., pp. 55102. Elsevier, Amsterdam.Google Scholar
Rivier, N. and Lissowski, A. (1982) On the correlation between sizes and shapes of cells in epithelial mosaics. J. Phys. A: Math. Gen. 15, L143L148.Google Scholar
Stoyan, D., Kendall, W. S. and Mecke, J. (1987) Stochastic Geometry and Its Application. Wiley, Chichester.Google Scholar
Weaire, D. (1974) Some remarks on the arrangement of grains in a polycrystal. Metallography 7, 157160.Google Scholar
Weaire, D. and Rivier, N. (1984) Soap, cells and statistics–random patterns in two dimensions. Contemp. Phys. 25, 5999.Google Scholar
Weiss, V. (1994) Further mean values for random tessellations of. ℝd. To appear.Google Scholar