On the existence of accessibility in a tree-indexed percolation model

Autor:	Coletti, Cristian F., Gava, R. J., Rodriguez, Pablo M.
Rok vydání:	2014
Předmět:	Mathematics - Probability
Zdroj:	Physica A (2018), 492, pages 382-388
Druh dokumentu:	Working Paper
DOI:	10.1016/j.physa.2017.10.019
Popis:	We study the accessibility percolation model on infinite trees. The model is defined by associating an absolute continuous random variable $X_v$ to each vertex $v$ of the tree. The main question to be considered is the existence or not of an infinite path of nearest neighbors $v_1,v_2,v_3\ldots$ such that $X_{v_1}0$ is a given constant. We show that there is a percolation threshold at $\alpha_c =1$ such that there is percolation if $\alpha> 1$ and there is absence of percolation if $\alpha \leq 1$. Moreover, we study the event of percolation starting at any vertex, as well as the continuity of the percolation probability function. Finally, we provide a comparison between this model with the well known $F^{\alpha}$ record model. We also discuss a number of open problems concerning the accessibility percolation model for further consideration in future research. Comment: This version has been partially rewritten due to a mistake in the proof of the main theorem in the previous version. New arguments have been used to prove the main result for a different family of growth functions. Other properties of the model, such as the existence of accessibility percolation infinitely often on the supercritical regime, have been studied
Databáze:	arXiv
Externí odkaz:	http://arxiv.org/abs/1410.3320 Zobrazit plný text záznamu View this record from Arxiv