Endre Csáki, Miklós Csörgő, Antonia Földes, Pál Révész
Published 2014-12-17Version 1
A simple symmetric random walk is considered on a spider that is a collection of half lines (we call them legs) joined at the origin. We establish a strong approximation of this random walk by the so-called Brownian spider. Transition probabilities are studied, and for a fixed number of legs we investigate how high the walker can go on the legs in $n$ steps. The heights on the legs are also investigated when the number of legs goes to infinity.
How Tall Can Be the Excursions of a Random Walk on a Spider
Limit theorems for local and occupation times of random walks and Brownian motion on a spider
On limit theorems for continued fractions
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