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| Main Authors: | , , , |
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| Format: | Preprint |
| Published: |
2026
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2603.03009 |
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Table of Contents:
- Consider an SI process on a graph $G$ where each S--I connection becomes I--I at rate $λ$. Here S and I stand for ``susceptible'' and ``infected'' respectively. The evoSI model is a modification of the SI model in which S--I edges are broken at rate $ρ$ and the ``S'' connects to a randomly chosen vertex. It is proven in Durrett and Yao [2022, Electron. J. Probab.] that, for the supercritical evoSI process on the configuration model, there exists a quantity $Δ$ depending on the first three moments of the degree distribution such that the sign of $Δ$ governs the continuity of the phase transition of the final epidemic size near the critical infection rate $λ_c$. In this paper, we consider the critical evoSI model on the configuration model, i.e., $λ=λ_c$. We show that, if $Δ>0$, then the probability of a major outbreak starting from a single infected individual is $Cn^{-1/3}(1+o(1))$ for some explicit constant $C>0$, where $n$ is the size of the graph. On the contrary, if $Δ<0$, then this probability is $o(n^{-1/3})$. The case $Δ<0$ is reminiscent of the critical {\ER} graphs, where the probability for the size of the largest component to be of order $n$ decays exponentially in $n$.