English

Degree-preserving graph dynamics -- a versatile process to construct random networks

Combinatorics 2024-01-09 v3 Discrete Mathematics Physics and Society

Abstract

Real-world networks evolve over time via additions or removals of vertices and edges. In current network evolution models, vertex degree varies or grows arbitrarily. A recently introduced degree-preserving network growth (DPG) family of models preserves vertex degree, resulting in structures significantly different from and more diverse than previous models ([Nature Physics 2021, DOI: 10.1038/s41567-021-01417-7]). Despite its degree preserving property, the DPG model is able to replicate the output of several well-known real-world network growth models. Simulations showed that many well-studied real-world networks can be constructed from small seed graphs. Here we start the development of a rigorous mathematical theory underlying the DPG family of network growth models. We prove that the degree sequence of the output of some of the well-known, real-world network growth models can be reconstructed via the DPG process, using proper parametrization. We also show that the general problem of deciding whether a simple graph can be obtained via the DPG process from a small seed (DPG feasibility) is, as expected, NP-complete. It is an important open problem to uncover whether there is a structural reason behind the DPG-constructibility of real-world networks.

Keywords

Cite

@article{arxiv.2111.11994,
  title  = {Degree-preserving graph dynamics -- a versatile process to construct random networks},
  author = {Péter L. Erdős and Shubha R. Kharel and Tamás R. Mezei and Zoltán Toroczkai},
  journal= {arXiv preprint arXiv:2111.11994},
  year   = {2024}
}

Comments

21 pages, 5 figures

R2 v1 2026-06-24T07:49:17.929Z