Random trees with local catastrophes: the Brownian case

Abstract

We introduce and study a model of plane random trees generalizing the famous Bienaym\'e--Galton--Watson model but where births and deaths are locally correlated. More precisely, given a random variable (B,H) with values in \1,2,3, …\2, given the state of the tree at some generation, the next generation is obtained (informally) by successively deleting B individuals side-by-side and replacing them with H new particles where the samplings are i.i.d. We prove that, in the critical case E[B]=E[H], and under a third moment condition on B and H, the random trees coding the genealogy of the population model converges towards the Brownian Continuum Random Tree. Interestingly, our proof does not use the classical height process or the ukasiewicz exploration, but rather the stochastic flow point of view introduced by Bertoin and Le Gall.