SOME NEW RESULTS ON THE CALTON-WATSON PROCESS

SUN Jiaming. SOME NEW RESULTS ON THE CALTON-WATSON PROCESS[J]. Chinese Journal of Applied Probability and Statistics, 1991, 7(2): 150-155.

Citation:

SUN Jiaming. SOME NEW RESULTS ON THE CALTON-WATSON PROCESS[J]. Chinese Journal of Applied Probability and Statistics, 1991, 7(2): 150-155.

Citation:

SUN Jiaming. SOME NEW RESULTS ON THE CALTON-WATSON PROCESS[J]. Chinese Journal of Applied Probability and Statistics, 1991, 7(2): 150-155.

Abstract

Let （Z₀, Z₁, Z₂, …） be a Galton-Watson process and T denote its extinction time, i. e. T=K \Leftrightarrow Z_k-1＞1 Z_k=0, b_j==\lim _n \rightarrow \infty P\left(Z_n=j \mid nm＜1, EZ₁ logZ₁=+∞, then \overline\lim _n \rightarrow \infty \fraca_nm^n\left(1-f_n(s)\right) \leqslant 1-\mathscrB(s), （2） If \lim _n \rightarrow \infty \sum_j=1^k \fracb_ja_n \cdot \frac1-\left(1-m^n\right)^jm^n<+\infty, then 1-f_n（s）=0（mⁿ/a_n）, （3）\lim _n \rightarrow \infty \fracq-f_n(s)r^n=\fracq\left(1-\mathscrB\left(\fracsq\right)\right)\sum_j=1^\infty j b_j, for m≠1 and EZ₁ log Z₁＜+∞, （4） We also prove two useful results by （3）, i. e. Theorem 3 and Theorem 4.

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