On Akcoglu and Sucheston’s operator convergence theorem in Lebesgue space

Abstract:

Let $T$ be a bounded linear operator on an ${L_1}$-space and $\tau$ its linear modulus. It is proved that if the adjoint of $\tau$ has a strictly positive subinvariant function then the following two conditions are equivalent: (i) ${T^n}$ converges weakly; (ii) $(1/n)\Sigma _{i = 1}^n{T^{{k_i}}}$ converges strongly for any strictly increasing sequence ${k_1},{k_2}, \cdots$ of nonnegative integers.