Weighted Point Configurations with Hyperuniformity: An Ecological Example and Models

Random point configurations are said to be in hyperuniform states, if density fluctuations are anomalously suppressed in large-scale. Typical examples are found in Coulomb gas systems in two dimensions especially called log-gases in random matrix theory, in which points are repulsively correlated by long-range potentials. In infertile lands like deserts continuous survival competitions for water and nutrition will cause long-ranged repulsive interactions among plants. We have prepared digital data of spatial configurations of center-of-masses for bushes weighted by bush sizes which we call masses. Data analysis shows that such ecological point configurations do not show hyperuniformity as unmarked point processes, but are in hyperuniform states as marked point processes in which mass distributions are taken into account. We propose the non-equilibrium statistical-mechanics models to generate marked point processes having hyperuniformity, in which iterations of random thinning of points and coalescing of masses transform initial uncorrelated point processes into non-trivial point processes with hyperuniformity. Combination of data analysis and computer simulations shows the importance of strong correlations in probability law between spatial point configurations and mass distributions of individual points to realize hyperuniform marked point processes.

• Publication year

  2025

• Venue

  Journal of the Physical Society of Japan

• Publication date

  2025-01-22

• Fields of study

  Biology, Physics, Environmental Science

• Identifiers
  DOI 10.7566/JPSJ.94.064002arXiv 2501.12807
• External record

  Open on Semantic Scholar

• Source metadata

  Semantic Scholar

• No claims are published for this paper.

• No concepts are published for this paper.

• Accumulated spectrograms for hyperuniform determinantal point processes

  2024cited by this paper
• Continuum Percolation and Stochastic Epidemic Models on Poisson and Ginibre Point Processes

  2021cited by this paper
• Non-Hermitian physics

  2020cited by this paper
• Zeros of the i.i.d. Gaussian Laurent Series on an Annulus: Weighted Szegő Kernels and Permanental-Determinantal Point Processes

  2020cited by this paper
• Local number variances and hyperuniformity of the Heisenberg family of determinantal point processes

  2020cited by this paper
• Spatial Variation

  2019cited by this paper
• Hyperuniform states of matter

  2018influential reference
• Clustering Effect on the Dynamics in a Spatial Rock-Paper-Scissors System

  2018influential reference
• Bessel Processes, Schramm–Loewner Evolution, and the Dyson Model

  2016cited by this paper
• Spatial Modeling and Analysis of Cellular Networks Using the Ginibre Point Process: A Tutorial

  2016cited by this paper
• Ginibre-type point processes and their asymptotic behavior

  2015cited by this paper
• A Cellular Network Model with Ginibre Configured Base Stations

  2014cited by this paper
• Determinantal Point Processes for Machine Learning

  2012cited by this paper
• Generalizations of Mat\'ern's hard-core point processes

  2012influential reference
• Log-Gases and Random Matrices (LMS-34)

  2010cited by this paper
• Log-Gases and Random Matrices

  2010cited by this paper
• Zeros of Gaussian Analytic Functions and Determinantal Point Processes

  2009cited by this paper
• Stochastic Geometry and Wireless Networks, Volume 1: Theory

  2009cited by this paper
• Variance of the linear statistics of the Ginibre random point field (Proceedings of RIMS Workshop on Stochastic Analysis and Applications)

  2008cited by this paper
• Large Deviations for the Fermion Point Process Associated with the Exponential Kernel

  2006cited by this paper
• Spectra and pseudospectra : the behavior of nonnormal matrices and operators

  2005cited by this paper
• Random Matrices

  2005cited by this paper
• An Introduction to the Theory of Point Processes, Vol. 1: Elementary Theory and Methods (2nd ed.) (Book)

  2004influential reference
• An Introduction to the Theory of Point Processes, Vol. I: Elementary Theory and Methods

  2004influential reference
• Random point fields associated with certain Fredholm determinants I: fermion, Poisson and boson point processes

  2003cited by this paper
• Emergence of a complex and stable network in a model ecosystem with extinction and mutation.

  2002cited by this paper
• Diversity of vegetation patterns and desertification.

  2001cited by this paper
• Gaussian limit for determinantal random point fields

  2000cited by this paper
• A simple model for the formation of vegetated dunes

  2000cited by this paper
• Regular and irregular patterns in semiarid vegetation

  1999cited by this paper
• Gaussian Fluctuation for the Number of Particles in Airy, Bessel, Sine, and Other Determinantal Random Point Fields

  1999cited by this paper
• Cluster-Cluster Aggregation of Calcium Carbonate Colloid Particles at the Air/Water Interface

  1995influential reference
• Gaussian fluctuation in random matrices.

  1994cited by this paper
• A STOCHASTIC MODEL FOR DRAINAGE PATTERNS INTO AN INTRAMONTANE TREINCH

  1967influential reference
• Statistical Ensembles of Complex, Quaternion, and Real Matrices

  1965influential reference
• Spatial variation : Stochastic models and their application to some problems in forest surveys and other sampling investigations

  1960influential reference
• Progress on the Study of the Ginibre Ensembles

  year unknowncited by this paper

• Hyperuniformity and conservation laws in non-equilibrium systems.

  2025cites this paper