AbstractWe prove that any positive power bounded operator T in a KB-space E which satisfies(1)limn→∞dist(1n∑k=0n−1Tkx,[−g,g]+ηBE)=0(∀x∈E,‖x‖⩽1), where BE is the unit ball of E, g∈E+, and 0⩽η<1, is mean ergodic and its fixed space Fix(T) is finite dimensional. This generalizes the main result of [E.Yu. Emelyanov, M.P.H. Wolff, Mean lower bounds for Markov operators, Ann. Polon. Math. 83 (2004) 11–19]. Moreover, under the assumption that E is a σ-Dedekind complete Banach lattice, we prove that if, for any positive power bounded operator T, the condition (1) implies that T is mean ergodic then E is a KB-space.

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