Infinite collisions of simple random walks on random recursive trees generated by Bernoulli sequences
Abstract
In this paper, we study random recursive trees generated by Bernoulli sequences. Starting from a graph with two vertices and one edge, each new vertex is connected to the last vertex with probability p , or to the second-last vertex with probability q = 1-p , this recursive construction yields a random infinite recursive tree T. We prove that T almost surely has exactly one topological end. Furthermore, we establish that T has the infinite collision property: two independent simple random walks on T collide infinitely often almost surely.
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