Strong law of large numbers for a function of the local times of a transient random walk on groups

Abstract

This paper presents the strong law of large numbers for a function of the local times of a transient random walk on groups, extending the research of Asymont and Korshunov for random walks on the integer lattice Zd. Under some weaker conditions, we prove that certain function of the local times converges almost surely and in L1 and L2. The proof is mainly based on the subadditive ergodic theorem.

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