A gapped generalization of Kingman's subadditive ergodic theorem
Abstract
We state and prove a generalization of Kingman's ergodic theorem on a measure-preserving dynamical system (X,F,μ,T) where the μ-almost sure subadditivity condition fn+m ≤ fn + fm Tn is relaxed to a μ-almost sure, "gapped", almost subadditivity condition of the form fn+σm+m ≤ fn +n + fm Tn+σn for some nonnegative n ∈ L1(dμ) and σn ∈ N \0\ that are suitably sublinear in n. This generalization has a first application to the existence of specific relative entropies for suitably decoupled measures on one-sided shifts.
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