Pruning of CRT-sub-trees
Abstract
We study the pruning process developed by Abraham and Delmas (2012) on the discrete Galton-Watson sub-trees of the L\'{e}vy tree which are obtained by considering the minimal sub-tree connecting the root and leaves chosen uniformly at rate , see Duquesne and Le Gall (2002). The tree-valued process, as increases, has been studied by Duquesne and Winkel (2007). Notice that we have a tree-valued process indexed by two parameters the pruning parameter and the intensity . Our main results are: construction and marginals of the pruning process, representation of the pruning process (forward in time that is as increases) and description of the growing process (backward in time that is as decreases) and distribution of the ascension time (or explosion time of the backward process) as well as the tree at the ascension time. A by-product of our result is that the super-critical L\'{e}vy trees independently introduced by Abraham and Delmas (2012) and Duquesne and Winkel (2007) coincide. This work is also related to the pruning of discrete Galton-Watson trees studied by Abraham, Delmas and He (2012).
Keywords
Cite
@article{arxiv.1212.2765,
title = {Pruning of CRT-sub-trees},
author = {Romain Abraham and Jean-François Delmas and Hui He},
journal= {arXiv preprint arXiv:1212.2765},
year = {2012}
}