Some conditional correlation inequalities for percolation and related processes

Berg, van den Hans; Häggström, Olle; Kahn, Jeffry

doi:10.1002/rsa.20102

Cited by 24 publications

(31 citation statements)

References 16 publications

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“…. , m are healthy} are negatively correlated.We prove (a stronger version of) this conjecture, and explain that in some sense it is a dual version of the planar case of one of our results in [2]. …”

mentioning

confidence: 63%

Proof of a conjecture of N. Konno for the 1D contact process

Berg¹,

Häggström²,

Kahn³

2006

Institute of Mathematical Statistics Lecture Notes - Monograph Series

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Consider the one-dimensional contact process. About ten years ago, N. Konno stated the conjecture that, for all positive integers n, m, the upper invariant measure has the following property: Conditioned on the event that O is infected, the events {All sites −n, . . . , −1 are healthy} and {All sites 1, . . . , m are healthy} are negatively correlated.We prove (a stronger version of) this conjecture, and explain that in some sense it is a dual version of the planar case of one of our results in [2].

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mentioning

confidence: 63%

Proof of a conjecture of N. Konno for the 1D contact process

Berg¹,

Häggström²,

Kahn³

2006

Institute of Mathematical Statistics Lecture Notes - Monograph Series

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“…We will use the fact that, for any λ ∈ (λ c , ∞), ν λ stochastically dominates a non-trivial Bernoulli product measure µ λ . This follows from Liggett and Steif [15], Theorem 1.2, Durrett and Schonmann [9], Theorem 1, and van den Berg, Häggström and Kahn [6], Theorem 3.5. Since Z δ (x) is monotone in ξ 0 , it is therefore enough to prove the statement under P µ λ .…”

Section: More On the Contact Processmentioning

confidence: 75%

“…We assume that 5) and that 6) i.e., the jump rate is constant and equal to γ everywhere, while the drift to the right is larger on infected sites than on healthy sites. Observe that the assumption in (1.6) is made without loss of generality: since the contact process is invariant under reflection in the origin, −W has the same law as W with inverted jump rates.…”

Section: Modelmentioning

confidence: 99%

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Scaling of a random walk on a supercritical contact process

Hollander¹,

Santos²

2014

Ann. Inst. H. Poincaré Probab. Statist.

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A proof is provided of a strong law of large numbers for a one-dimensional random walk in a dynamic random environment given by a supercritical contact process in equilibrium. The proof is based on a coupling argument that traces the space-time cones containing the infection clusters generated by single infections and uses that the random walk eventually gets trapped inside the union of these cones. For the case where the local drifts of the random walk are smaller than the speed at which infection clusters grow, the random walk eventually gets trapped inside a single cone. This in turn leads to the existence of regeneration times at which the random walk forgets its past. The latter are used to prove a functional central limit theorem and a large deviation principle.The qualitative dependence of the speed and the volatility on the infection parameter is investigated, and some open problems are mentioned.Acknowledgment. The authors would like to thank Stein Bethuelsen and Markus Heydenreich for stimulating discussions, and the anonymous referee for useful suggestions.MSC 2000. Primary 60F15, 60K35, 60K37; Secondary 82B41, 82C22, 82C44.

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“…The concept of downwards FKG was made explicit in [12], and was further studied in [2], where it was proved that the upper invariant measure for the contact process is downwards FKG.…”

Section: Definition 18 a Measure µ On {0 1} S Is Downwards Fkg If mentioning

confidence: 98%