Mathematics (Apr 2024)

Research on Group Behavior Modeling and Individual Interaction Modes with Informed Leaders

  • Yude Fu,
  • Jing Zhu,
  • Xiang Li,
  • Xu Han,
  • Wenhui Tan,
  • Qizi Huangpeng,
  • Xiaojun Duan

DOI
https://doi.org/10.3390/math12081160
Journal volume & issue
Vol. 12, no. 8
p. 1160

Abstract

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This study investigates coordinated behaviors and the underlying collective intelligence in biological groups, particularly those led by informed leaders. By establishing new convergence condition based on experiments involving real biological groups, this research introduces the concept of a volitional term and heterogeneous networks, constructing a coupled-force Cucker–Smale model with informed leaders. Incorporating informed leaders into the leader-follower group model enables a more accurate representation of biological group behaviors. The paper then extracts the Flock Leadership Hierarchy Network (FLH), a model reflecting real biological interactions. Employing time slicing and rolling time windows, the study methodically analyzes group behavior stages, using volatility and convergence time as metrics to examine the relationship between group consistency and interactions. Comparative experiments show the FLH network’s superior performance. The Kolmogorov-Smirnov test demonstrates that the FLH network conforms to a power-law distribution, a prevalent law in nature. This result further illuminates the crucial role that power-law distribution plays in the evolutionary processes of biological communities. This study offers new perspectives on the evolution of biological groups, contributing to our understanding of the behaviors of both natural and artificial systems, such as animal migration and autonomous drone operations.

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