The probabilities of extinction in a branching random walk on a strip

Abstract

We consider a class of multitype Galton-Watson branching processes with a countably infinite type set Xd whose mean progeny matrices have a block lower Hessenberg form. For these processes, the probability q(A) of extinction in subsets of types A⊂eq Xd may differ from the global extinction probability q and the partial extinction probability q. After deriving partial and global extinction criteria, we develop conditions for q<q(A)<q. We then present an iterative method to compute the vector q(A) for any set A. Finally, we investigate the location of the vectors q(A) in the set of fixed points of the progeny generating vector.