Yaglom theorem for critical branching random walk on Zd
Abstract
We study the critical branching random walk on Zd started from a distant point x and conditioned to hit some compact set K in Zd. We are interested in the occupation time in K and present its asymptotic behaviors in different dimensions. It is shown in this work that the occupation time is of order \|x\|4-d in dimensions d≤ 3, of order \|x\| in dimension d=4, and of order 1 in dimensions d≥ 5. The corresponding weak convergences are also established. These results answer a question raised by Le Gall and Merle (Elect. Comm. in Probab. 11 (2006), 252-265).
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