Rumor Processes on $$\mathbb {N}$$ N and Discrete Renewal Processes

Gallo, Sandro; Garcia, Nancy L.; Vargas, Valdivino; Rodríguez, Pablo M.

doi:10.1007/s10955-014-0959-1

Cited by 16 publications

(42 citation statements)

References 18 publications

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“…Lemma 1 in [6] states that the probability that the firework process on N reaches site n is equal to the probability that an undelayed renewal sequence (see Section 4 above) Y with hazard rate…”

Section: Proofs Of the Main Resultsmentioning

confidence: 99%

Frog models on trees through renewal theory

Gallo

Rodríguez

2018

J. Appl. Probab.

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Section: Proofs Of the Main Resultsmentioning

confidence: 99%

Frog models on trees through renewal theory

Gallo

Rodríguez

2018

J. Appl. Probab.

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“…The use of a non-standard version of Borel-Cantelli lemma helped in the task of finding conditions for the processes to die out. Gallo et al [5] based the proofs of their results on a clever relationship between the rumor processes and a specific discrete time renewal process. With this technique they were able to obtain more precise results for homogeneous versions of the processes.…”

Section: Disk Percolation On Treesmentioning

confidence: 99%

“…(iii) Reverse fireworks processes on Z. Individuals throw their radius of influence to every direction as in (1.1) (See Gallo et all [5]).…”

Section: Heterogeneous Reverse Fireworkmentioning

confidence: 99%

“…(iv) If E(N) < ∞ and E(R) < ∞ then P(V ) = 0. (v) If lim inf n→∞ nP(R ≥ n)ϕ ′ N (P(R < n)) > 1 then P(V ) > 0.A consequence of Theorem 1 from Gallo et al[5] is the following result It is possible to have E(N) = ∞, E(R) = ∞ and P(V ) = 0. Take P(N ≥ n) ∼ 1 n when n → ∞ and P(R ≥ n) = 1 n ln n ln(lnn) 6.1.2.…”

mentioning

confidence: 93%

“…Gallo et al[5]). If µ < ∞ thenZ(n) n a.s. −→ µ −1 ,and thus, with probability one, µ −1 is the final proportion of spreaders.…”

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confidence: 99%

See 2 more Smart Citations

The Rumor Percolation Model and Its Variations

Valdivino

Machado

Ravishankar

2019

Sojourns in Probability Theory and Statistical Physics - II

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The study of rumor models from a percolation theory point of view has gained a few adepts in the last few years. The persistence of a rumor, which may consistently spread out throughout a population can be associated to the existence of a giant component containing the origin of a graph. That is one of the main interest in percolation theory. In this paper we present a quick review of recent results on rumor models of this type.

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Discrete One-Dimensional Coverage Process on a Renewal Process

Gallo

Garcia

2018

J Stat Phys

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We consider the following coverage model on N. For each site i ∈ N we associate a pair (ξi, Ri) where {ξ0, ξ1, . . .} is a 1-dimensional undelayed discrete renewal point process and {R0, R1, . . .} is an i.i.d. sequence of N-valued random variables. At each site where ξi = 1 we start an interval of length Ri. Coverage occurs if every site of N is covered by some interval. We obtain sharp conditions for both, positive and null probability of coverage. As corollaries, we extend results of the literature of rumor processes and discrete one-dimensional Boolean percolation.

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Rumor Processes on $$\mathbb {N}$$ N and Discrete Renewal Processes

Cited by 16 publications

References 18 publications

Frog models on trees through renewal theory

Frog models on trees through renewal theory

The Rumor Percolation Model and Its Variations

Discrete One-Dimensional Coverage Process on a Renewal Process

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