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Updated: Oct 23, 2025

Development of an Individual-Tree Basal Area Increment Model using a Linear Mixed-Effects Approach
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Analytic solution of the two-star model with correlated degrees.

Maíra Bolfe1, Fernando L Metz2, Edgar Guzmán-González3

  • 1Physics Department, Federal University of Santa Maria, 97105-900 Santa Maria, Brazil.

Physical Review. E
|August 20, 2021
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Summary
This summary is machine-generated.

This study analyzes complex networks using a two-star model with degree correlations. It reveals a phase transition affecting network structure and degree distribution based on correlation types.

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Area of Science:

  • Network Science
  • Statistical Physics
  • Complex Systems

Background:

  • Exponential random graphs are crucial for modeling real-world complex networks.
  • Understanding degree-degree correlations is key to network structure analysis.

Purpose of the Study:

  • To solve the two-star model with degree-degree correlations in the sparse regime.
  • To investigate the phase transitions and resulting network properties.

Main Methods:

  • Exact computation of network free energy.
  • Analysis of degree distributions and assortativity.
  • Characterization of phase transitions in the model.

Main Results:

  • The model exhibits a first-order phase transition to a condensed phase.
  • Degree correlations influence the degree distribution (single-peak or bimodal).
  • Degree assortativity shows nonmonotonic and discontinuous behavior.

Conclusions:

  • The findings provide insights into network structure with correlated degrees.
  • Accurate determination of critical points aids in developing advanced network models.
  • The study clarifies the impact of nearest and next-nearest neighbor correlations on network topology.