Ibrahima Drame, Etienne Pardoux
Published 2017-06-19Version 1
In this work, we study asymptotics of the genealogy of Galton-Watson processes. Thus we consider a offspring distribution such that the rescaled Galton-Watson processes converges to a continuous state branching process (CSBP) with jumps. After we show that the rescaled height (or exploration) process of the corresponding Galton-Watson family tree, converges in a functional sense, to the continuous height process that Le Gall and Le Jan introduced in 1998 on their paper "branching processes in L\'evy processes : The exploration process".
Changing the branching mechanism of a continuous state branching process using immigration
Convergence of random series and the rate of convergence of the strong law of large numbers in game-theoretic probability
Convergence in law of the minimum of a branching random walk
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