Asymptotic expansions of solutions to Markov renewal equations and their application to general branching processes

Abstract

We consider the Markov renewal equation F(t) = f(t) + μ*F(t) for vector-valued functions f,F: R Rp and a p × p matrix μ of locally finite measures μi,j on [0,∞), i,j=1,…,p. Sgibnev [Semimultiplicative estimates for the solution of the multidimensional renewal equation. Izv.\ Ross.\ Akad.\ Nauk Ser.\ Mat., 66(3):159--174, 2002] derived an asymptotic expansion for the solution F to the above equation. We give a new, more elementary proof of Sgibnev's result, which also covers the reducible case. As a corollary, we infer an asymptotic expansion for the mean of a multi-type general branching process with finite type space counted with random characteristic. Finally, some examples are discussed that illustrate phenomena of multi-type branching.

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