English

Mapping cumulus clouds to scale invariant rough surfaces

Statistical Mechanics 2022-05-02 v1

Abstract

Motivated by a recent observation on the self-organized criticality of cumulus clouds (Phys. Rev E 103, 052106, 2021) we study their connection to self-similar rough surfaces, in which flogIf\equiv \log I plays the role of the main field, where II is the intensity of the received visible light. By simulating the light scattering based on a coarse-grained phenomenological model in a two-dimensional cloud, we argue the possible connection of II to the actual cloud thickness. Although in the vertical incident light ff is proportional to the cloud thickness, in the general case it is complected. We study the statistical properties of observational data for ff with a focus on the conventional exponents of this scale-invariant rough surface. By calculating the roughness exponents, and comparing them with other exponents like the fractal dimension of loops, the distribution function of the radius of gyration and loop lengths, and the exponent of the green function, we prove that this surface is unconventional in the sense that it is the non-Gaussian self-affine random surface which violates the Kondev hyper-scaling relations.

Keywords

Cite

@article{arxiv.2204.13783,
  title  = {Mapping cumulus clouds to scale invariant rough surfaces},
  author = {J. Cheraghalizadeh and S. Tizdast and H. Mohammadzade and M. N. Najafi},
  journal= {arXiv preprint arXiv:2204.13783},
  year   = {2022}
}
R2 v1 2026-06-24T11:02:04.026Z