Large deviations for Lotka-Nagaev estimator of a randomly indexed branching process

Abstract: Consider a continuous time process {Y t = Z N t , t ≥ 0}, where {Z n } is a supercritical Galton-Watson process and {N t } is a renewal process which is independent of {Z n }. Firstly, we study the asymptotic properties of the harmonic moments E(Y −r t) of order r > 0 as t → ∞. Then, we obtain the large deviations of the Lotka-Negaev estimator of offspring mean.

Deviations for Martingale Convergence of a Branching Process with Random Index

Deviations for Martingale Convergence of a Branching Process with Random Index

Asymptotic distributions and Berry-Esseen inequalities for Lotka-Nagaev estimator of a Poisson randomly indexed branching process