arXiv:1011.4183 Abstract | arXiv Analytics

arXiv:1011.4183 [math.PR]Abstract References Reviews Resources

Asymptotic Behaviors of The Size of The Largest Cluster in One Dimensional Percolation

Published 2010-11-18, updated 2010-11-29Version 2

This paper focuses on the asymptotic behaviors of the length of the largest 1-cluster in a finite iid Bernoulli sequence. We first reveal a critical phenomenon on the length and then study its limit distribution.

Comments: This paper has been withdrawn by the auther. Because the main result (Theorem 1.1) is not new, it was first proved by Erdos and Renyi (1970) and is called the Erdos-Renyi Law

Categories: math.PR

Keywords: asymptotic behaviors, largest cluster, dimensional percolation, finite iid bernoulli sequence, paper focuses

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arXiv:1011.4183 [math.PR]Abstract References Reviews Resources

Asymptotic Behaviors of The Size of The Largest Cluster in One Dimensional Percolation

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Asymptotic Behaviors of The Size of The Largest Cluster in One Dimensional Percolation

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arXiv:1011.4183 [math.PR]Abstract References Reviews Resources