A Law of Iterated Logarithm on Lamplighter Diagonal Products

Abstract

We prove a Law of Iterated Logarithm for random walks on a family of diagonal products constructed by Brieussel and Zheng (2021). This provides a wide variety of new examples of Law of Iterated Logarithm behaviours for random walks on groups. In particular, it follows that for any 12≤ β≤ 1 there is a group G and random walk Wn on G with E|Wn| nβ such that 0< |Wn|nβ( n)1-β<∞ and 0< |Wn|( n)1-βnβ<∞.

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