Edge fluctuations for the one dimensional supercritical contact process
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Publication:1103279
DOI10.1214/aop/1176992086zbMath0645.60103OpenAlexW2071838652WikidataQ105584326 ScholiaQ105584326MaRDI QIDQ1103279
Antonio Galves, Errico Presutti
Publication date: 1987
Published in: The Annals of Probability (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1214/aop/1176992086
functional central limit theoreminvariance principlesupercritical contact processextremal invariant measuresedge fluctuations
Related Items (17)
The asymmetric contact process on a finite set ⋮ The asymmetric contact process ⋮ The box-crossing property for critical two-dimensional oriented percolation ⋮ Approximations finies de la mesure invariante du processus de contact sur-critique vu par la première particule. (Finite approximations of the invariant measure of supercritical contact processes as seen from the first particle) ⋮ The critical contact process seen from the right edge ⋮ Convergence in distribution for subcritical 2D oriented percolation seen from its rightmost point ⋮ Stochastic Sequences with a Regenerative Structure that May Depend Both on the Future and on the Past ⋮ Effect of noise on front propagation in reaction-diffusion equations of KPP type ⋮ Travelling wave structure of the one dimensional contact process ⋮ The central limit theorem for supercritical oriented percolation in two dimensions ⋮ Poisson percolation on the oriented square lattice ⋮ A lower bound for the order parameter in the one-dimensional contact process ⋮ Hydrodynamic equations for attractive particle systems on Z ⋮ The asymmetric contact process at its second critical value ⋮ The contact process as seen from a random walk ⋮ A contact process with a single inhomogeneous site. ⋮ An invariance principle for the edge of the branching exclusion process
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