Convergence of Martingale and Moderate Deviations for a Branching Random Walk with a Random Environment in Time |
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| Authors: | Xiaoqiang Wang Chunmao Huang |
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| Affiliation: | 1.School of Mathematics and Statistics,Shandong University (Weihai),Weihai,China;2.Department of Mathematics,Harbin Institute of Technology at Weihai,Weihai,China |
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| Abstract: | ![]()
We consider a branching random walk on ({mathbb {R}}) with a stationary and ergodic environment (xi =(xi _n)) indexed by time (nin {mathbb {N}}). Let (Z_n) be the counting measure of particles of generation n and (tilde{Z}_n(t)=int mathrm{e}^{tx}Z_n(mathrm{d}x)) be its Laplace transform. We show the (L^p) convergence rate and the uniform convergence of the martingale (tilde{Z}_n(t)/{mathbb {E}}[tilde{Z}_n(t)|xi ]), and establish a moderate deviation principle for the measures (Z_n). |
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