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Self-switching random walks on Erdös–Rényi random graphs feel the phase transition

Author

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  • Iacobelli, G.
  • Ost, G.
  • Takahashi, D.Y.

Abstract

We study random walks on Erdös–Rényi random graphs in which, every time the random walk returns to the starting point, first an edge probability is independently sampled according to a priori measure μ, and then an Erdös–Rényi random graph is sampled according to that edge probability. When the edge probability p does not depend on the size of the graph n (dense case), we show that the proportion of time the random walk spends on different values of p – occupation measure – converges to the a priori measure μ as n goes to infinity. More interestingly, when p=λ/n (sparse case), we show that the occupation measure converges to a limiting measure with a density that is a function of the survival probability of a Poisson branching process. This limiting measure is supported on the supercritical values for the Erdös–Rényi random graphs, showing that self-witching random walks can detect the phase transition.

Suggested Citation

  • Iacobelli, G. & Ost, G. & Takahashi, D.Y., 2025. "Self-switching random walks on Erdös–Rényi random graphs feel the phase transition," Stochastic Processes and their Applications, Elsevier, vol. 183(C).
  • Handle: RePEc:eee:spapps:v:183:y:2025:i:c:s0304414925000304
    DOI: 10.1016/j.spa.2025.104589
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