English

Time reversal dualities for some random forests

Probability 2015-04-24 v2

Abstract

We consider a random forest F\mathcal{F}^*, defined as a sequence of i.i.d. birth-death (BD) trees, each started at time 0 from a single ancestor, stopped at the first tree having survived up to a fixed time TT. We denote by (ξt, 0tT)\left(\xi^*_t,\ 0\leq t\leq T\right) the population size process associated to this forest, and we prove that if the BD trees are supercritical, then the time-reversed process (ξTt, 0tT)\left(\xi^*_{T-t},\ 0\leq t\leq T\right), has the same distribution as (ξ~t, 0tT)\left(\widetilde\xi^*_t,\ 0\leq t\leq T\right), the corresponding population size process of an equally defined forest F~\widetilde{\mathcal{F}}^*, but where the underlying BD trees are subcritical, obtained by swapping birth and death rates or equivalently, conditioning on ultimate extinction. We generalize this result to splitting trees (i.e. life durations of individuals are not necessarily exponential), provided that the i.i.d. lifetimes of the ancestors have a specific explicit distribution, different from that of their descendants. The results are based on an identity between the contour of these random forests truncated up to TT and the duality property of L\'evy processes. This identity allows us to also derive other useful properties such as the distribution of the population size process conditional on the reconstructed tree of individuals alive at TT, which has potential applications in epidemiology.

Keywords

Cite

@article{arxiv.1409.6040,
  title  = {Time reversal dualities for some random forests},
  author = {Miraine Dávila Felipe and Amaury Lambert},
  journal= {arXiv preprint arXiv:1409.6040},
  year   = {2015}
}

Comments

28 pages, 3 figures

R2 v1 2026-06-22T06:01:56.609Z