Critical value for contact processes on clusters of oriented bond percolation
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Publication:1619231
DOI10.1016/J.PHYSA.2015.12.101zbMath1400.60131arXiv1408.0568OpenAlexW2218362679MaRDI QIDQ1619231
Publication date: 13 November 2018
Published in: Physica A (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1408.0568
Related Items (7)
Critical value for the contact process with random recovery rates and edge weights on regular tree ⋮ Law of large numbers for the SIR model with random vertex weights on Erdős-Rényi graph ⋮ Contact processes with random recovery rates and edge weights on complete graphs ⋮ Phase transition for the large-dimensional contact process with random recovery rates on open clusters ⋮ Phase transition for SIR model with random transition rates on complete graphs ⋮ Asymptotic of the critical value of the large-dimensional SIR epidemic on clusters ⋮ Exponential rate for the contact process extinction time
Cites Work
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- The complete convergence theorem holds for contact processes in a random environment on \({\mathbb Z}^d \times {\mathbb Z}^{+}\)
- The contact process on the complete graph with random vertex-dependent infection rates
- The binary contact path process
- Discrete stochastic modeling for epidemics in networks
- Contact processes on random graphs with power law degree distributions have critical value 0
- The contact process on trees
- Contact processes with random connection weights on regular graphs
- The complete convergence theorem holds for contact processes on open clusters of \(\mathbb Z^{d }\times \mathbb Z^{+}\)
- Percolation
- Oriented percolation in dimensions d ≥ 4: bounds and asymptotic formulas
- Contact processes with random vertex weights on oriented lattices
- Probability
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