Harmonic moments and large deviations for a critical Galton-Watson process with immigration (2004.08748v1)

Abstract: In this paper, a critical Galton-Watson branching process with immigration $Z_{n}$ is studied. We first obtain the convergence rate of the harmonic moment of $Z_{n}$. Then the large deviation of $S_{Z_n}:=\sum_{i=1}^{Z_n} X_i$ is obtained, where ${X_i}$ is a sequence of independent and identically distributed zero-mean random variables with tail index $\alpha>2$. We shall see that the converging rate is determined by the immigration mean, the variance of reproducing and the tail index of $X_1^+$, comparing to previous result for supercritical case, where the rate depends on the Schr\"{o}der constant and the tail index.