English

E2 distribution and statistical regularity in polygonal planar tessellations

Statistical Mechanics 2021-10-13 v2 Soft Condensed Matter Biological Physics

Abstract

From solar supergranulation to salt flat in Bolivia, from veins on leaves to cells on Drosophila wing discs, polygon-based networks exhibit great complexities, yet similarities persist and statistical distributions can be remarkably consistent. Based on analysis of 99 polygonal tessellations of a wide variety of physical origins, this work demonstrates the ubiquity of an exponential distribution in the squared norm of the deformation tensor, E2E^{2}, which directly leads to the ubiquitous presence of Gamma distributions in polygon aspect ratio. The E2E^{2} distribution in turn arises as a χ2\chi^{2}-distribution, and an analytical framework is developed to compute its statistics. E2E^{2} is closely related to many energy forms, and its Boltzmann-like feature allows the definition of a pseudo-temperature. Together with normality in other key variables such as vertex displacement, this work reveals regularities universally present in all systems alike

Keywords

Cite

@article{arxiv.2002.11166,
  title  = {E2 distribution and statistical regularity in polygonal planar tessellations},
  author = {Ran Li and Consuelo Ibar and Zhenru Zhou and Seyedsajad Moazzeni and Kenneth D. Irvine and Liping Liu and Hao Lin},
  journal= {arXiv preprint arXiv:2002.11166},
  year   = {2021}
}

Comments

18 pages, 4 figures

R2 v1 2026-06-23T13:53:48.267Z