Consistent estimation in subcritical birth-and-death processes
Abstract
We investigate parameter estimation in subcritical continuous-time birth-and-death processes with multiple births. We show that the classical maximum likelihood estimators for the model parameters, based on the continuous observation of a single non-extinct trajectory, are not consistent in the usual sense: conditional on survival up to time t, they converge as t ∞ to the corresponding quantities in the associated Q-process, namely the process conditioned to survive in the distant future. We develop the first C-consistent estimators in this setting, which converge to the true parameter values when conditioning on survival up to time t, and establish their asymptotic normality. The analysis relies on spine decompositions and coupling techniques.
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