Decomposable branching processes having a fixed extinction moment

Abstract

The asymptotic behavior, as n→ ∞ of the probability of the event that a decomposable critical branching process Z(m)=(Z1(m),...,ZN(m)), m=0,1,2,..., with N types of particles dies at moment n is investigated and conditional limit theorems are proved describing the distribution of the number of particles in the process Z(·) at moment m<n, given that the extinction moment of the process is n. These limit theorems may be considered as the statements describing the distribution of the number of vertices in the layers of certain classes of simply generated random trees having a fixed hight.