Exponentials and R-recurrent random walks on groups
Abstract
On a locally compact group E with countable base, we consider a random walk X that has a unique (up to a positive factor) r-invariant measure for some r>0. Under some weak conditions on the measure, there is a unique continuous exponential on E naturally associated with X. It follows that there exists an R-recurrent random walk in the sense of Tweedie on E if and only if E is a recurrent group and there exists a Harris random walk on~E.
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